Since a = 1 cannot be written in the form bc for any c E A. Therefore, R is not transitive and hence, not an equivalence relation on A.
(a) Yes, R is an equivalence relation on A.The relation R is an equivalence relation if it satisfies the following properties:
Reflexive: Each element of A is related to itself.i.e. aRa for all a E A.Each element a of A can be written in the form a = bc and b = ad for some c, d E A, then aRa, since a = bc = adc = dbc, and thus aRa.Symmetric: If a is related to b, then b is related to a.i.e., if aRb, then bRa.
Transitive: If a is related to b and b is related to c, then a is related to c.i.e., if aRb and bRc, then aRc.Suppose aRb and bRc, then there exists c, d, e, and f such that:a = bd,b = ae, and c = bf.
Then, a = b(d) = a(e)(d) = c(e)(d), so aRc. Hence, R is an equivalence relation.(b) R is not an equivalence relation on A.
This is because the relation R is not transitive.
Suppose a = 1, b = 2, and c = 3.
Then, aRb since a = bc with c = 2. Similarly, bRc since b = ad with d = 3.
However, a is not related to c, since a = 1 cannot be written in the form bc for any c E A. Therefore, R is not transitive and hence, not an equivalence relation on A.
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Apply Jacobi's method to the given system. Take the zero vector as the initial approximation and work with four-significant-digit accuracy until two successive iterates agree within 0.001 in each variable. Compare your answer with the exact solution found using any direct method you like. (Round your answers to three decimal places.)
The solution of system of equations by Jacobi's method is,
x = 0.4209 ≅ 0.42
y = 0.9471 ≅ 0.95
The given system of equation is,
3.5x - 0.5y = 1
x - 1.5y = -1
Now apply Jacobi's method to solve this system,
From the above equations
xk+1 = (1/3.5) (1+0.5yk)
yk+1= (1/-1.5) (-1-xk)
Initial gauss (x,y)=(0,0)
Solution steps are
1st Approximation
x1 = (1/3.5) [1+0.5(0)] = 1/3.5 [1] =0.2857
y1 = (1/-1.5)[-1-(0)] = 1/-1.5 [-1] = 0.6667
2nd Approximation
x2 = (1/3.5) [1+0.5(0.6667)] = 1/3.5[1.3333] = 0.381
y2 = (1/-1.5)[-1-(0.2857)] = 1/-1.5 [-1.2857] = 0.8571
3rd Approximation
x3 = (1/3.5)[1+0.5(0.8571)] = (1/3.5)[1.4286] = 0.4082
y3 = (1/-1.5)[-1-(0.381)] = (1/-1.5) [-1.381] = 0.9206
4th Approximation
x4 = (1/3.5)[1+0.5(0.9206)] = 1/3.5[1.4603] = 0.4172
y4 = (1/-1.5)[-1-(0.4082)] = 0.9388
5th Approximation
x5 = (1/3.5)[1+0.5(0.9388)] = 0.4198
y5 = (1/-1.5)[-1-(0.4172)] = 0.9448
6th Approximation
x6 = (1/3.5)[1+0.5(0.9448)] = 0.4207
y6 = (1/-1.5)[-1-(0.4198)] = 0.9466
7th Approximation
x7 = (1/3.5)[1+0.5(0.9466)] = 0.4209
y7 = (1/-1.5)[-1-(0.4207)] = 0.9471
Solution By Gauss Jacobi Method.
x = 0.4209 ≅ 0.42
y = 0.9471 ≅ 0.95
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Evaluate the following integral.
Evaluate the following integral. 5 X S[(x+y) dy dx ОО 5 X Jusay S[+y) (x + y) dy dx = OO (Simplify your answer.)
Evaluate the iterated integral. 7 3 y SS dy dx 10VX + y? 7 3 dy dx = 10VX + y?
The first integral can be evaluated by switching the order of integration and simplifying the resulting expression. The value of the first integral is 125. The value of the second integral is -240.
To evaluate the first integral, we can switch the order of integration by considering the limits of integration. The given integral is ∫∫(x+y) dy dx over the region Ω, where Ω represents the limits of integration. Let's denote the region as R: 0 ≤ y ≤ 5 and 0 ≤ x ≤ 5. We can rewrite the integral as ∫∫(x+y) dx dy over the region R.
Integrating with respect to x first, we have:
[tex]∫∫(x+y) dx dy = ∫(∫(x+y) dx) dy = ∫((1/2)x^2 + xy)∣₀₅ dy = ∫((1/2)5^2 + 5y) - (0 + 0) dy= ∫(12.5 + 5y) dy = (12.5y + (5/2)y^2)∣₀₅ = (12.5(5) + (5/2)(5^2)) - (12.5(0) + (5/2)(0^2))[/tex]
= 62.5 + 62.5 = 125.
Therefore, the value of the first integral is 125.
For the second integral, ∫∫∫7 3 y SS dy dx over the region defined as 10VX + y, we need to evaluate the inner integral first. Integrating with respect to y, we have:
[tex]∫∫∫7 3 y SS dy dx = ∫∫(∫7 3 y SS dy) dx = ∫∫((1/2)y^2 + Sy)∣₇₃ dx = ∫(1/2)(3^2 - 7^2) + S(3 - 7) dx[/tex]
= ∫(1/2)(-40) - 4 dx = -20x - 4x∣₀₁₀ = -20(10) - 4(10) - (-20(0) - 4(0)) = -200 - 40 = -240.
Hence, the value of the second integral is -240.
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URGENT!!! pls help :)
Question 1 (Essay Worth 4 points)
One large jar and three small jars together can hold 14 ounces of jam. One large jar minus one small jar can hold 2 ounces of jam.
A matrix with 2 rows and 2 columns, where row 1 is 1 and 3 and row 2 is 1 and negative 1, is multiplied by matrix with 2 rows and 1 column, where row 1 is l and row 2 is s, equals a matrix with 2 rows and 1 column, where row 1 is 14 and row 2 is 2.
Use matrices to solve the equation and determine how many ounces of jam are in each type of jar. Show or explain all necessary steps.
Answer:
the large jar contains 5 ounces of jam, and each small jar contains 3 ounces of jam.
Step-by-step explanation:
To solve the given problem using matrices, let's assign variables to represent the number of ounces of jam in each type of jar. We'll use the following variables:
L: Ounces of jam in the large jar.
S: Ounces of jam in each small jar.
Now, let's set up the equations based on the information given:
Equation 1: One large jar and three small jars together can hold 14 ounces of jam.
This equation can be written as:
1L + 3S = 14
Equation 2: One large jar minus one small jar can hold 2 ounces of jam.
This equation can be written as:
1L - 1S = 2
Now, let's represent these equations in matrix form:
Equation 1:
[1 3] [L] [14]
*
Equation 2:
[1 -1] [S] [ 2]
Multiplying the matrices gives us:
[1L + 3S] [14]
=
[1L - 1S] [ 2]
Simplifying the matrix equation, we have:
[1L + 3S] = [14]
[1L - 1S] = [ 2]
This can be written as a system of equations:
1L + 3S = 14 --(Equation A)
1L - 1S = 2 --(Equation B)
To solve this system, we can use the method of elimination. Let's eliminate the variable L by adding Equation A and Equation B:
(Equation A) + (Equation B):
1L + 3S + 1L - 1S = 14 + 2
Simplifying:
2L + 2S = 16 --(Equation C)
Now, we have two equations:
2L + 2S = 16 --(Equation C)
1L - 1S = 2 --(Equation B)
Let's multiply Equation B by 2 to make the coefficients of L in both equations equal:
2(1L - 1S) = 2 * 2
2L - 2S = 4 --(Equation D)
Now, we have two equations:
2L + 2S = 16 --(Equation C)
2L - 2S = 4 --(Equation D)
We can now eliminate the variable S by adding Equation C and Equation D:
(Equation C) + (Equation D):
2L + 2S + 2L - 2S = 16 + 4
Simplifying:
4L = 20
Dividing both sides of the equation by 4, we get:
L = 5
Now, substitute the value of L back into Equation B to find S:
1L - 1S = 2
1(5) - 1S = 2
5 - 1S = 2
-1S = 2 - 5
-1S = -3
Dividing both sides of the equation by -1, we get:
S = 3
Therefore, the large jar contains 5 ounces of jam, and each small jar contains 3 ounces of jam.
To solve this problem, we can use matrices. Let's call the number of ounces of jam in the large jar "L" and the number of ounces of jam in each small jar "S". We can set up two equations based on the information given:
L + 3S = 14 (since one large jar and three small jars together can hold 14 ounces of jam)
L - S = 2 (since one large jar minus one small pot can hold 2 ounces of jam)
We can write these equations in matrix form:
[1 3] [L] [14]
[1 -1] [S] = [2]
To solve for L and S, we need to multiply both sides of the equation by the inverse of the matrix on the left:
[1 3]^-1 [1 3] [L] [1 3]^-1 [14]
[1 -1] [1 -1] [S] = [1 -1] [2]
The inverse of the matrix [1 3; 1 -1] is:
[1/4 3/4]
[1/4 -1/4]
So we have:
[L] [1/4 3/4] [14]
[S] = [1/4 -1/4] [2]
Multiplying out the matrices gives us the following:
[L] [(1/4)*14 + (3/4)*2]
[S] = [(1/4)*14 - (1/4)*2]
So L = 5 and S = 3. Therefore, there are 5 ounces of jam in the large jar and 3 ounces in each small jar.
State the average rate of change for the situation. Be sure to include units. Chris grew from 151 cm tall at age 12 to 180 cm tall at age 16. Chris grew (Simplify your a years. cm. cm/year. K
To find the average rate of change in height for Chris, we need to determine the change in height and the corresponding change in age.
Change in height = Final height - Initial height
= 180 cm - 151 cm
= 29 cm
Change in age = Final age - Initial age
= 16 years - 12 years
= 4 years
Average rate of change = Change in height / Change in age
= 29 cm / 4 years
= 7.25 cm/year
Therefore, the average rate of change for Chris's height is 7.25 cm/year.
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Use the Divergence Theorem to find the flux of the vector field i = iy+ (2xy + 22) + k2yz and a unit cube at the origin + Select one: 2 3 4 None of them
w333The Divergence Theorem is a critical vector calculus result that is used to determine the flow of a vector field through a surface. A unit cube is a three-dimensional object with edges of length 1 unit. The divergence of a vector field describes how quickly the field's values are changing at a particular point in space.
It is represented by the operator div.According to the Divergence Theorem, the flux of a vector field through a surface is equal to the divergence of the field over the enclosed volume.Here's the solution to the given problem:Given that the vector field is,i = iy + (2xy + 22) + k2yzThe divergence of the vector field is:div(i) = (∂/∂x) . i + (∂/∂y) . j + (∂/∂z) . k(2xy + 22) + 0 + 2yz= 2xy + 2yz + 22Therefore, the flux of the vector field through the unit cube can be calculated as follows:flux = ∫∫S i.dS= ∫∫S i.n dSwhere S is the surface area, n is the normal unit vector, and i.n is the dot product of i and n. Since the unit cube is centered at the origin and is symmetric, the flux through each face is the same, and the sum of the flux through each face is zero. Hence, the flux through one face of the cube can be computed as follows:flux = ∫∫S i.n dS= ∫∫S i.n dS= ∫∫S i.y dxdz= ∫_0^1 ∫_0^1 y dydz= ∫_0^1 dz= 1Therefore, the flux of the vector field through the unit cube at the origin is 1. Therefore, the answer is 1.
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> Q2). Using the Integral Test, check the convergence of the given series by venifying the necessary conditions of integral test OP (Sin?7+n+ (03) na
Answer: By using the integral test we found that the given series is divergent.
Step-by-step explanation: To check the convergence of the series ∑(n=1 to ∞) [sin(7+n) + (0.3) / n], we can apply the Integral Test.
According to the Integral Test, if a function f(x) is positive, continuous, and decreasing on the interval [1, ∞), and if the series ∑(n=1 to ∞) f(n) converges or diverges, then the integral ∫(1 to ∞) f(x) dx also converges or diverges, respectively.
Let's analyze the given series step by step:
1. Consider the function f(x) = sin(7 + x) + (0.3) / x.
2. The function f(x) is positive for all x ≥ 1 since sin(7 + x) lies between -1 and 1, and (0.3) / x is positive for x ≥ 1.
3. The function f(x) is continuous on the interval [1, ∞) as it is a sum of continuous functions.
4. To check if f(x) is decreasing, we need to examine its derivative.
The derivative of f(x) with respect to x is given by:
f'(x) = cos(7 + x) - 0.3 / x^2.
Since the cosine function is bounded between -1 and 1, and x^2 is positive for x ≥ 1, we can conclude that f'(x) ≤ 0 for all x ≥ 1.
Therefore, f(x) is a decreasing function.
5. Now, we need to determine if the integral ∫(1 to ∞) f(x) dx converges or diverges.
∫(1 to ∞) f(x) dx = ∫(1 to ∞) [sin(7 + x) + (0.3) / x] dx
Applying integration by parts to the second term, (0.3) / x:
∫(1 to ∞) (0.3) / x dx = 0.3 * ln(x) |(1 to ∞)
Taking the limits:
lim as b→∞ [0.3 * ln(b)] - [0.3 * ln(1)]
lim as b→∞ [0.3 * ln(b)] - 0.3 * 0
lim as b→∞ [0.3 * ln(b)]
Since ln(b) approaches ∞ as b approaches ∞, this limit is ∞.
Therefore, the integral ∫(1 to ∞) f(x) dx diverges.
6. By the Integral Test, since the integral diverges, the series ∑(n=1 to ∞) [sin(7 + n) + (0.3) / n] also diverges.
Hence, the given series is divergent.
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Consider the curve C given by the vector equation r(t) = ti + tºj + tk. (a) Find the unit tangent vector for the curve at the t = 1. (b) Give an equation for the normal vector at t = 1. (c) Find the curvature at t = 1. (d) Find the tangent line to the curve at the point (1,1,1).
(a) The unit tangent vector for the curve at t = 1 is (1, 0, 1). (b) The normal vector at t = 1 can be expressed as (-1, 0, 1). (c) The curvature at t = 1 is 0.(d) The tangent line to the curve at the point (1, 1, 1) is given by the parametric equations x = 1 + t, y = 1, z = 1 + t.
(a) To find the unit tangent vector at t = 1, we differentiate the vector equation with respect to t, which gives us r'(t) = i + 0j + k. Evaluating this at t = 1, we get the unit tangent vector T(1) = (1, 0, 1).
(b) The normal vector at t = 1 is perpendicular to the tangent vector. Since the tangent vector is (1, 0, 1), we can choose the normal vector to be perpendicular to both the x and z components. One possible choice is the vector (-1, 0, 1).
(c) The curvature of a curve is given by the formula κ = ||T'(t)|| / ||r'(t)||, where T(t) is the unit tangent vector and r'(t) is the derivative of the vector equation. In this case, since the derivative of r(t) is constant, we have T'(t) = 0. Thus, at t = 1, the curvature is κ(1) = ||0|| / ||r'(1)|| = 0.
(d) The tangent line to a curve at a specific point is determined by the point and the tangent vector at that point. At (1, 1, 1), we have the tangent vector T(1) = (1, 0, 1). Using the point-normal form of a line equation, we can write the tangent line as (x - 1) / 1 = (y - 1) / 0 = (z - 1) / 1. Simplifying this equation, we get x = 1 + t, y = 1, z = 1 + t, where t is a parameter that determines points on the tangent line.
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Use L'Hôpital's rule to find the limit. Note that in this problem, neither algebraic simplification nor the theorem for limits of rational functions at infinity provides an alternative to L'Hôpital's rule. 8x-8 lim x-1 In x? Select the correct choice below and, if necessary, fill in the answer box to complete your choice. BX-8 lim OA. - In (Simplify your answer.) OB The limit does not exist
The correct choice is OB: The limit does not exist.
To apply L'Hôpital's rule, we need to differentiate both the numerator and the denominator separately and then evaluate the limit again. Let's differentiate the numerator and the denominator:
Numerator: Taking the derivative of 8x - 8 with respect to x, we get 8.
Denominator: Taking the derivative of x - 1 in the denominator with respect to x, we get 1.
Now, let's evaluate the limit again:
lim (x -> 1) (8x - 8) / (x - 1)
Plugging in the values we obtained after differentiation:
lim (x -> 1) 8 / 1
This gives us the result:
lim (x -> 1) 8 = 8
Since the limit does not approach a finite value as x approaches 1, we conclude that the limit does not exist. Therefore, the correct choice is OB: The limit does not exist.
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Consider the differential equation y' + p(x)y = g(x) and assume that this equation has the following two particular solutions yı() = 621 – cos(2x) + sin(2x), y(x) = 2 cos(2x) + sin(2x) – 2e24. Which of the following is the general solution to the same differential equation: COS (a) y(x) = C1[e22 - cos(2x) + sin(2.c)] + c2[2 cos(2x) + sin(2x) - 2e2 (b) y(x) = C1621 – cos(2x) + sin(2x) (c) y(x) = Ci [e2x – cos(2x)] + sin(2x) (d) y(1) = e21 – cos(2x) + C2 sin(2x), where C1 and C2 are arbitrary constants.
The general solution to the given differential equation is y(x) = C(1 + e^2x - cos(2x) + sin(2x)), where C is an arbitrary constant.
To determine the general solution to the differential equation y' + p(x)y = g(x), we can combine the particular solutions given and find the form of the general solution. The particular solutions given are y1(x) = 6 - cos(2x) + sin(2x) and y2(x) = 2cos(2x) + sin(2x) - 2e^2x.
Let's denote the general solution as y(x) = C1y1(x) + C2y2(x), where C1 and C2 are arbitrary constants.
Substituting the particular solutions into the general form, we have:
y(x) = C1(6 - cos(2x) + sin(2x)) + C2(2cos(2x) + sin(2x) - 2e^2x).
Now, we can simplify and rearrange the terms:
y(x) = (6C1 + 2C2) + (C1 - 2C2)e^2x + (C1 + C2)(-cos(2x) + sin(2x)).
Since C1 and C2 are arbitrary constants, we can rewrite them as a single constant C:
y(x) = C + Ce^2x - C(cos(2x) - sin(2x)).
Finally, we can factor out the constant C:
y(x) = C(1 + e^2x - cos(2x) + sin(2x)).
Among the provided choices, the correct answer is (c) y(x) = C1(e^2x - cos(2x)) + sin(2x), which is equivalent to the general solution y(x) = C(1 + e^2x - cos(2x) + sin(2x)) by adjusting the constant term.
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2. Find the volume of the solid obtained by rotating the region bounded by y=x-x? and y = 0 about the line x = 2. (6 pts.) X
the volume of the solid obtained by rotating the region bounded by y = x - x² and y = 0 about the line x = 2 is π/6 cubic units.
To find the volume of the solid obtained by rotating the region bounded by y = x - x² and y = 0 about the line x = 2, we can use the method of cylindrical shells.
The volume of a solid generated by rotating a region about a vertical line can be calculated using the formula:
V = ∫[a,b] 2πx * f(x) dx
In this case, the region is bounded by y = x - x² and y = 0. To determine the limits of integration, we need to find the x-values where these curves intersect.
Setting x - x² = 0, we have:
x - x² = 0
x(1 - x) = 0
So, x = 0 and x = 1 are the points of intersection.
The volume of the solid is then given by:
V = ∫[0,1] 2πx * (x - x²) dx
Let's evaluate this integral:
V = 2π ∫[0,1] (x² - x³) dx
= 2π [(x³/3) - (x⁴/4)] evaluated from 0 to 1
= 2π [(1/3) - (1/4) - (0 - 0)]
= 2π [(1/3) - (1/4)]
= 2π [(4/12) - (3/12)]
= 2π (1/12)
= π/6
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Relative to an origin O, the position vectors of the points A, B and C are given by
0A=i- j+2k, OB=-i+ j+k and OC = j+ 2k respectively. Let Il is the plane
containing O1 and OB.
(in)
Find a non-zero unit vector # which is perpendicular to the plane I.
(IV)
Find the orthogonal projection of OC onto n.
(v)
Find the orthogonal projection of OC on the plane I.
(i) OA and OB are orthogonal.
(ii) OA and OB are not independent.
(iii) a non-zero unit vector that is perpendicular to the plane is 3√2.
What are the position vectors?
A straight line with one end attached to a body and the other end attached to a moving point that is used to define the point's position relative to the body. The position vector will change in length, direction, or both length and direction as the point moves.
Here, we have
Given: A = i- j+2k, B = -i+ j+k and C = j+ 2k
(i) OA. OB = (i- j+2k). (-i + j + k)
= - 1 - 1 + 2 = 0
Hence, OA and OB are orthogonal.
(ii) OA = λOB
(i- j+2k) = λ(-i + j + k)
i - j + 2k = -λi + λj + λk
-λ = 1
λ = -1
OA ≠ OB
Hence, OA and OB are not independent.
(iii) OA × OB = [tex]\left|\begin{array}{ccc}i&j&k\\1&-1&2\\-1&1&1\end{array}\right|[/tex]
= i(-1-2) - j(1+2) + k(1-1)
= -3i - 3j + 0k
= |OA × OB| = [tex]\sqrt{9+9}[/tex] = 3√2
Hence, a non-zero unit vector # which is perpendicular to the plane is 3√2.
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Use the divergence theorem to find the outward flux of xa F(x, y, z) = x^2i - 2xy ĵ +3 xz Å the closed surface enclosing the portion of the sphere x² + y² + z = 4 (in first octant)
The outward flux of the vector field F(x, y, z) = x^2i - 2xy ĵ + 3xz Å across the closed surface enclosing the portion of the sphere x² + y² + z = 4 (in the first octant) can be found using the divergence theorem.
How can we determine the outward flux of F(x, y, z) across the given closed surface?The divergence theorem relates the flux of a vector field across a closed surface to the divergence of the field within the volume enclosed by that surface. Mathematically, it states that the outward flux (Φ) across a closed surface (S) enclosing a volume (V) is equal to the triple integral of the divergence (div) of the vector field (F) over the volume V.
To apply the divergence theorem, we first calculate the divergence of F. Taking the divergence of F, we obtain div(F) = 2x - 2y + 3.
Next, we evaluate the triple integral of div(F) over the volume V. Since the closed surface encloses the first octant of the sphere x² + y² + z = 4, we integrate over the corresponding portion of the sphere within the given limits.
The divergence theorem, also known as Gauss's theorem, is a fundamental concept in vector calculus. It establishes a relationship between the flux of a vector field across a closed surface and the behavior of the field within the enclosed volume. By integrating the divergence of the vector field over the volume, we can determine the outward flux across the closed surface.
The divergence of a vector field represents the rate at which the field is expanding or contracting at each point in space. In this case, the divergence of F(x, y, z) = x^2i - 2xy ĵ + 3xz Å is given by div(F) = 2x - 2y + 3. The triple integral of div(F) over the volume enclosed by the surface allows us to calculate the total flux.
By applying the divergence theorem to the given problem, we can find the outward flux of F across the closed surface enclosing the portion of the sphere x² + y² + z = 4 in the first octant. The solution involves evaluating the triple integral of the divergence of F over the specified volume. Once this integral is computed, it will yield the desired result, providing a quantitative measure of the outward flux.
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Evaluate the integral by completing the square and using the following formula. (Remember to use absolute values where appropriate. Use C for the constant of integration.) dx VK) = 2a 2x + 4 dx 4x2 +
The integral [tex]\(\int \frac{{2a}}{{2x+4}}dx\)[/tex] can be evaluated by completing the square and using the formula. The answer is [tex]\(\frac{{a}}{{2}} \ln |2x + 4| + C\)[/tex].
To evaluate the integral, we start by factoring out a 2 from the denominator to simplify the expression: [tex]\(\int \frac{{2a}}{{2(x+2)}}dx\)[/tex]. Next, we can complete the square in the denominator by adding and subtracting the square of half the coefficient of x, which is 1 in this case: [tex]\(\int \frac{{2a}}{{2(x+2)}}dx = \int \frac{{2a}}{{2(x+2)}}dx + \int \frac{{2a}}{{2(x+2)}}dx\)[/tex]. Now, we can rewrite the integrand as [tex]\(\frac{{a}}{{x+2}}\)[/tex] and split the integral into two parts. The first integral is [tex]\(\int \frac{{a}}{{x+2}}dx\)[/tex], which evaluates to [tex]\(a \ln |x+2|\)[/tex]. The second integral is [tex]\(\int \frac{{a}}{{x+2}}dx\)[/tex], which is equivalent to [tex]\(\int \frac{{a}}{{2}} \cdot \frac{{2}}{{x+2}}dx\)[/tex]. The 2 in the numerator and the 2 in the denominator cancel out, giving us [tex]\(\frac{{a}}{{2}}\ln |x+2|\)[/tex]. Therefore, the final answer is [tex]\(\frac{{a}}{{2}} \ln |2x + 4| + C\)[/tex], where C is the constant of integration.
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First Order Equations. 1. (4 pts) Find the general solution of the given differential equation and use it to determine how solutions behave as t → 00. y' + y = 5 sin (21) 2. (3 pts) Solve the init
To find the general solution of the differential equation y' + y = 5sin(2t), we can solve it using the method of integrating factors.
The differential equation is in the form y' + p(t)y = q(t), where p(t) = 1 and q(t) = 5sin(2t).
First, we find the integrating factor, which is given by the exponential of the integral of p(t):
[tex]μ(t) = e^∫p(t) dtμ(t) = e^∫1 dtμ(t) = e^t[/tex]
Next, we multiply both sides of the differential equation by the integrating factor:
[tex]e^ty' + e^ty = 5e^tsin(2t)[/tex]Now, we can rewrite the left side of the equation as the derivative of the product of the integrating factor and the dependent variable y:
(d/dt)(e^ty) = 5e^tsin(2t)Integrating both sides with respect to t, we get:
[tex]e^ty = ∫(5e^tsin(2t)) dt[/tex]
To evaluate the integral on the right side, we can use integration by parts. Assuming u = sin(2t) and dv = e^t dt, we have du = 2cos(2t) dt and v = e^t.
The integral becomes:
[tex]e^ty = 5(e^tsin(2t)) - 2∫(e^tcos(2t)) dt[/tex]
Again, applying integration by parts to the remaining integral, assuming u = cos(2t) and dv = e^t dt, we have du = -2sin(2t) dt and v = e^t.The integral becomes:
[tex]e^ty = 5(e^tsin(2t)) - 2(e^tcos(2t)) + 4∫(e^tsin(2t)) dt[/tex]
Now, we have a new integral that is the same as the original one. We can substitute the value of e^ty back into the equation and solve for y:
[tex]y = 5sin(2t) - 2cos(2t) + 4∫(e^tsin(2t)) dt[/tex]This is the general solution of the given differential equation. To determine how solutions behave as t approaches infinity (t → ∞), we can analyze the behavior of the individual terms in the solution. The first two terms, 5sin(2t) and -2cos(2t), are periodic functions that oscillate between certain values. The last term, the integral, might require further analysis or approximation techniques to determine its behavior as t approaches infinity.The second part of the question is missing. Please provide the initial conditions or additional information to solve the initial value problem.
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Water is drained from a swimming pool at a rate given by R(t) = 80 e -0.041 gal/hr. If the drain is left open indefinitely, how much water drains from the pool? Set up the integral needed to compute t
∫(0 to ∞) R(t) dt evaluating the integral for the drain to compute t we get 80 e -0.041 gal/hr
To compute the total amount of water drained from the pool when the drain is left open indefinitely, we need to set up an integral.
The rate at which water is drained from the pool is given by R(t) = 80e^(-0.041t) gallons per hour, where t represents time in hours. To find the total amount of water drained, we need to integrate the rate function over an indefinite time period.
The integral to compute the total amount of water drained is:
∫(0 to ∞) R(t) dt
Here, the lower limit of the integral is 0, as we start counting from the beginning, and the upper limit is infinity (∞) to represent an indefinite time period.
By evaluating this integral, we can find the total amount of water drained from the pool when the drain is left open indefinitely.
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Evaluate the integral by completing the square and using the following formula. (Remember to use absolute values where appropriate. Use C for the constant of integration.) dx · 12² 121 ¹n ( | X = 2
The given integral can be evaluated using the technique of completing the square. By completing the square and applying the given formula, we can find the value of the integral when x = 2.
To evaluate the integral [tex]\int\{12^2 / (121 - x^2)^n } \, dx[/tex], where n = 1, and evaluate it at x = 2, we can use the technique of completing the square.
First, let's rewrite the denominator as a perfect square:
[tex](121 - x^2) = (11 + x)(11 - x)[/tex].
Next, we complete the square by factoring out the square of half the coefficient of x and adding the square to both sides of the equation. Here, the coefficient of x is 0, so we don't need to complete the square.
Using the given formula, we have:
[tex]\int\ { 12^2 / (121 - x^2)^n\, dx = (1/2) * (12^2) * arcsin(x/11) / (11^{2n-1}) + C.}[/tex]
Substituting x = 2 into the formula, we can find the value of the integral at x = 2.
However, please note that the given integral has a variable 'n,' and its value is not specified. To provide a specific numerical result, we would need the value of 'n.'
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A clinical study related to diabetes and the effectiveness of the testing procedure is summarized below. • 2% of the population has diabetes The false positive rate is 12% The true positive rate is 81% . . Use Bayes' Theorem to find the probability that a subject actually has diabetes, given that the subject has a positive test result. Round your answer to 3 decimal places.
Using Bayes' Theorem, the probability that a subject actually has diabetes, given that the subject has a positive test result, is calculated to be ____. (rounded to 3 decimal places)
Bayes' Theorem is a mathematical formula used to calculate conditional probabilities. In this case, we want to find the probability of a subject having diabetes given that they have a positive test result.
Let's denote:
A = Event of having diabetes
B = Event of testing positive
According to the given information:
P(A) = 0.02 (2% of the population has diabetes)
P(B|A) = 0.81 (true positive rate)
P(B|not A) = 0.12 (false positive rate)
We can now apply Bayes' Theorem:
P(A|B) = (P(B|A) * P(A)) / P(B)
To calculate P(B), we need to consider both scenarios: a true positive (diabetic person testing positive) and a false positive (non-diabetic person testing positive).
P(B) = P(B|A) * P(A) + P(B|not A) * P(not A)
= 0.81 * 0.02 + 0.12 * 0.98
Substituting the values into the formula:
P(A|B) = (0.81 * 0.02) / (0.81 * 0.02 + 0.12 * 0.98)
Calculating this expression will give the probability that a subject actually has diabetes, given that they have a positive test result, rounded to 3 decimal places.
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Find the volume of the solid formed by rotating the region
enclosed by x=0, x=1, y=0, y=3+x^5 about the
Y-AXIS
= (1 point) Find the volume of the solid formed by rotating the region enclosed by x = 0, x = 1, y=0, y = 3+.25 about the y-axis. Volume = 9.94838 =
The volume of the solid formed by rotating the region enclosed by x=0, x=1, y=0, y=3+x^5 about the Y-axis is approximately 9.94838.
To find the volume of the solid formed by rotation, we can use the method of cylindrical shells. The formula for the volume of a solid obtained by rotating a region about the y-axis is given by V = ∫(2πx)(f(x))dx, where f(x) represents the function that defines the region.
In this case, the region is enclosed by the lines x=0, x=1, y=0, and y=3+x^5. To simplify the calculation, we can approximate the function as y=3+0.25. Thus, we have f(x) = 3+0.25.
Substituting the values into the formula, we get V = ∫(2πx)(3+0.25)dx, integrated from x=0 to x=1. Evaluating the integral, we find that the volume is approximately 9.94838.
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One third of the trees in an orchard are olive trees.
One-quarter of the trees are fig trees.
The others are 180 mixed fruit trees.
In the first week of the season the owner harvests one-third of the olive trees and one third of the fig trees. How many trees in the orchard still have to be harvested?
In the orchard, one-third of the trees are olive trees, which means the olive trees constitute 1/3 of the total trees. Similarly, one-quarter of the trees are fig trees, which means the fig trees constitute 1/4 of the total trees. The remaining trees are 180 mixed fruit trees. 7/36 of the total trees need to be harvested.
Let's assume there are a total of x trees in the orchard.
The number of olive trees is (1/3) * x.
The number of fig trees is (1/4) * x.
The number of mixed fruit trees is 180.
In the first week of the season, the owner harvests one-third of the olive trees, which is (1/3) * (1/3) * x = (1/9) * x olive trees.
Similarly, the owner harvests one-third of the fig trees, which is (1/3) * (1/4) * x = (1/12) * x fig trees.
The total number of trees that need to be harvested is the sum of the harvested olive trees and the harvested fig trees:
(1/9) * x + (1/12) * x = (4/36 + 3/36) * x = (7/36) * x.
Therefore, 7/36 of the total trees need to be harvested. To find the actual number of trees, we need to know the value of x.
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Use separation of variables to solve the initial value problem. dy and y = -1 when x = 0 dx 3y + 5 5 - x2 1)
The solution to the initial value problem is given by:$$-2\ln|y+1|+3\ln|3y+5| = x + \ln\frac{8}{15}$$
The given differential equation is:
$\frac{dy}{dx}=\frac{3y+5}{5-x²}$.
The initial condition is given as:
$y=-1$ when $x=0$.
First, separate the variables as shown below:
$\frac{5-x²}{3y+5}dy=dx$
Now integrate both sides of the equation:
$\int\frac{5-x²}{3y+5}dy=\int dx$
We can now integrate the left-hand side using partial fractions.
We write the expression as:
$$\frac{5-x²}{3y+5}
= \frac{A}{y+1} + \frac{B}{3y+5}$$
We can then equate the numerators:$$5 - x²
= A(3y + 5) + B(y + 1)$$
Substitute $y = -1$ and $x = 0$ into the equation above to get $A = -2$.
Now substitute $y = 0$ and $x = 1$ to get $B = 3$.
Therefore, we have:$$\frac{5-x²}{3y+5} = \frac{-2}{y+1} + \frac{3}{3y+5}$$
Now, substituting this into the original equation,
we get:$$\int\frac{-2}{y+1}+\frac{3}{3y+5}dy=\int dx$$
Integrating both sides of the equation:
$$-2\ln|y+1|+3\ln|3y+5| = x+C$$
Substitute the initial value $y = -1$ and $x = 0$ into the equation above to get $C = \ln(8/15)$.
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Sketch and label triangle ABC where A = 20°, B = 80°, c = 13 cm. Solve the triangle to find all missing measurements, rounding all results to the nearest whole number.
After solving the triangle we have the measurements as angles A = 20°, B = 80°, C = 80° and length of the sides as a ≈ 5 cm, b ≈ 13 cm, c = 13 cm
.
To sketch and solve triangle ABC, where A = 20°, B = 80°, and c = 13 cm, we start by drawing a triangle and labeling the given angle and side.
Sketching the Triangle:
Start by drawing a triangle. Label one of the angles as A (20°), another angle as B (80°), and the side opposite angle B as c (13 cm). Ensure the triangle is drawn to scale.
Solving the Triangle:
To find the missing measurements, we can use the Law of Sines and the fact that the sum of angles in a triangle is 180°.
a) Finding angle C:
Since the sum of angles in a triangle is 180°, we can find angle C:
C = 180° - A - B
C = 180° - 20° - 80°
C = 80°
b) Finding side a:
Using the Law of Sines:
a / sin(A) = c / sin(C)
a / sin(20°) = 13 / sin(80°)
a ≈ 5 cm (rounded to the nearest whole number)
c) Finding side b:
Using the Law of Sines:
b / sin(B) = c / sin(C)
b / sin(80°) = 13 / sin(80°)
b ≈ 13 cm (rounded to the nearest whole number)
Now we have the measurements of the triangle:
A = 20°, B = 80°, C = 80°
a ≈ 5 cm, b ≈ 13 cm, c = 13 cm
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What is the particular solution to the differential equation
dy/dx=x^2(2y-3)^2 with the initial condition y(0)=-1?
The particular solution to the given differential equation dy/dx = x^2(2y-3)^2 with the initial condition y(0) = -1 can be found by separating variables and integrating.
To find the particular solution, we can separate variables and integrate both sides of the differential equation. Rearranging the equation, we have dy / (x^2(2y-3)^2) = dx.
To integrate the left side, we can use a substitution. Let u = 2y - 3, then du = 2dy, and the equation becomes (1/2) du / (x^2u^2).
Now, we can integrate both sides with respect to their respective variables. Integrating the left side gives us (1/2) ∫ du / u^2 = -(1 / (2u)).
For the right side, we integrate dx, which is simply x + C, where C is a constant of integration.
Putting the pieces together, we have -(1 / (2u)) = x + C.
Substituting back u = 2y - 3, we get -(1 / (2(2y - 3))) = x + C.
Simplifying, we have -1 / (4y - 6) = x + C.
Rearranging the equation to solve for y, we find 4y - 6 = -1 / (x + C).
Finally, solving for y, we have y = (3/2) - (1 / (2(x^3/3 + C))), where C is the constant of integration determined by the initial condition y(0) = -1.
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fF.d F.dr, where F(x,y)=xyi+yzj+zxk and C is the twisted cubic given by x=t,y=t²,z=t³,0 ≤ t ≤ 1 is C 26 27 30 0 0 0
The line integral ∫F · dr along the curve C is 9/10.
To evaluate the line integral ∫F · dr along the curve C, where F(x, y, z) = xyi + yzj + zxk and C is the twisted cubic given by x = t, y = t², z = t³ for 0 ≤ t ≤ 1, we need to parameterize the curve C and compute the dot product between F and the tangent vector dr.
The parameterization of C is:
r(t) = ti + t²j + t³k
To compute dr, we take the derivative of r(t) with respect to t:
dr = (dx/dt)i + (dy/dt)j + (dz/dt)k
dr = i + 2tj + 3t²k
Now we can compute the dot product between F and dr:
F · dr = (xy)(dx/dt) + (yz)(dy/dt) + (zx)(dz/dt)
F · dr = (t)(i) + (t²)(2t)(j) + (t)(t³)(3t²)(k)
F · dr = ti + 2t³j + 3t⁴k
To evaluate the line integral, we integrate F · dr with respect to t over the interval [0, 1]:
∫[0,1] F · dr = ∫[0,1] (ti + 2t³j + 3t⁴k) dt
Integrating each component separately:
∫[0,1] ti dt = (1/2)t² ∣[0,1] = (1/2)(1)² - (1/2)(0)² = 1/2
∫[0,1] 2t³j dt = (1/4)t⁴ ∣[0,1] = (1/4)(1)⁴ - (1/4)(0)⁴ = 1/4
∫[0,1] 3t⁴k dt = (1/5)t⁵ ∣[0,1] = (1/5)(1)⁵ - (1/5)(0)⁵ = 1/5
Adding the results together:
∫[0,1] F · dr = (1/2) + (1/4) + (1/5) = 5/10 + 2/10 + 2/10 = 9/10
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12 - 3t² t≤2 -10872t 9t² t>2 where t is measured in seconds. 0 6 Let s(t) be the position (in meters) at time t (seconds). Assume s(0) = 0. The goal is to determine the **exact** value of s(t) for
The goal is to determine the exact value of s(t), the position (in meters) at time t (seconds), given the piecewise-defined function for s(t) as follows:
For t ≤ 2, s(t) = 12 - 3t^2
For t > 2, s(t) = -10872t + 9t^2
To find the exact value of s(t), we need to evaluate the function for different ranges of t.
For t ≤ 2, we substitute t into the expression s(t) = 12 - 3t^2. This gives us the position for t values less than or equal to 2.
For t > 2, we substitute t into the expression s(t) = -10872t + 9t^2. This gives us the position for t values greater than 2.
By plugging in the appropriate values of t into the respective expressions, we can calculate the exact value of s(t) for any given time t, taking into account the conditions specified by the piecewise-defined function.
In summary, to determine the exact value of s(t), we evaluate the piecewise-defined function for the specified ranges of t, substituting the values of t into the respective expressions. This allows us to calculate the position at any given time t, taking into account the conditions provided by the function.
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= Homework: Section 7.5 Enhanced Assignment As Question 9, 7.5.19 Part 1 of 2 Find the least squares line and use it to estimate y for the indicated value of x. Next questic X 0.5 4 7.5 11 14.5 21.5 2
The least squares line is a linear regression line that best fits the given data points. It is used to estimate the value of y for a given value of x. In this question, we are asked to find the least squares line and use it to estimate y for x = 2.
To find the least squares line, we first calculate the slope and intercept using the least squares method. The slope (m) is given by the formula:
m = (n∑(xiyi) - (∑xi)(∑yi)) / (n∑(xi^2) - (∑xi)^2)
where n is the number of data points, xi and yi are the values of x and y, respectively. ∑xi represents the sum of all x values, and ∑(xiyi) represents the sum of the product of xi and yi.
Next, we calculate the intercept (b) using the formula:
b = (∑yi - m(∑xi)) / n
Once we have the slope and intercept, we can form the equation of the least squares line, which is of the form y = mx + b.
Using the given data points (x, y), we can substitute x = 2 into the equation and solve for y to estimate its value. The estimated value of y for x = 2 can be calculated by substituting x = 2 into the equation of the least squares line.
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please do these 3 multiple
choice questions, no work or explanation is required just answers
are pwrfect fine, will leave a like for sure!
Question 17 (1 point) How many solutions are there to the system of equations 2x+9y-31 and -10x+6y=-2? infinity 3 01 0
Question 18 (1 point) Determine the value of k for which there is an infinite nu
Question 17: 1 solution; Question 18: k = 5; Question 19: Infinite solutions
Question 17: How many solutions are there to the system of equations 2x+9y=31 and -10x+6y=-2?
To determine the number of solutions, we can use various methods such as graphing, substitution, or elimination. In this case, we can use the method of elimination by multiplying the first equation by 10 and the second equation by 2 to eliminate the x terms. This gives us 20x + 90y = 310 and -20x + 12y = -4.
By adding the two equations together, we get 102y = 306, which simplifies to y = 3. Substituting this value of y back into either of the original equations, we find that x = 2.
Therefore, the system of equations has a unique solution, which means there is 1 solution.
Question 18: Determine the value of k for which there is an infinite number of solutions.
To determine the value of k, we need to look at the system of equations and analyze its coefficients. However, since the second equation is not provided, it is not possible to determine the value of k or whether there are infinite solutions. Additional information or equations are needed to solve this problem.
Question 19: How many solutions are there to the system of equations -3x + 4y = 12 and 9x - 12y = -36?
To determine the number of solutions, we can use the method of elimination. By multiplying the first equation by 3 and the second equation by -1, we can eliminate the x terms. This gives us -9x + 12y = -36 and -9x + 12y = 36.
Subtracting the two equations, we get 0 = 0. This means the two equations are dependent and represent the same line. Therefore, there are infinite solutions to this system of equations.
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If f (u, v) = 5u²v – 3uv³, find f (1,2), fu (1,2), and fv (1, 2). a) f (1, 2) b) fu (1, 2) c) fv (1, 2)
a) f(1, 2) = -14 ,b) fu(1, 2) = -4 ,c) fv(1, 2) = -31 for the function f(u, v) = 5u²v – 3uv³
To find f(1, 2), fu(1, 2), and fv(1, 2) for the function f(u, v) = 5u²v – 3uv³, we need to evaluate the function and its partial derivatives at the given point (1, 2).
a) f(1, 2):
To find f(1, 2), substitute u = 1 and v = 2 into the function:
f(1, 2) = 5(1²)(2) - 3(1)(2³)
= 5(2) - 3(1)(8)
= 10 - 24
= -14
So, f(1, 2) = -14.
b) fu(1, 2):
To find fu(1, 2), we differentiate the function f(u, v) with respect to u while treating v as a constant:
fu(u, v) = d/dx (5u²v - 3uv³)
= 10uv - 3v³
Substitute u = 1 and v = 2 into the derivative:
fu(1, 2) = 10(1)(2) - 3(2)³
= 20 - 24
= -4
So, fu(1, 2) = -4.
c) fv(1, 2):
To find fv(1, 2), we differentiate the function f(u, v) with respect to v while treating u as a constant:
fv(u, v) = d/dx (5u²v - 3uv³)
= 5u² - 9uv²
Substitute u = 1 and v = 2 into the derivative:
fv(1, 2) = 5(1)² - 9(1)(2)²
= 5 - 9(4)
= 5 - 36
= -31
So, fv(1, 2) = -31.
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Consider the vector v=(2 -1 -3) in Rz. v belongs to Sp n{( 2 -10), (1 2 -3)}. - Select one: True False
The vector v = (2, -1, -3) does not belong to the span of the set {(2, -10), (1, 2, -3)} in R3.
To determine if v belongs to the span of the set {(2, -10), (1, 2, -3)}, we need to check if v can be expressed as a linear combination of the vectors in the set. In other words, we need to find scalars c1 and c2 such that v = c1(2, -10) + c2(1, 2, -3).
If we attempt to solve this equation, we get the following system of equations:
2c1 + c2 = 2
-10c1 + 2c2 = -1
-3c2 = -3
Solving this system, we find that there is no solution. Therefore, v cannot be expressed as a linear combination of the given vectors, indicating that v does not belong to the span of the set. Hence, the statement is false.
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For the function f(x,y)= 3ln(7y - 4x²), find the following: a) fx. b) fy 3. (5 pts each)
For the function f(x,y)= 3ln(7y - 4x²): (a) \(f_x(x, y) = \frac{{-24x}}{{7y - 4x^2}}\), (b) \(f_y(x, y) = \frac{{7}}{{7y - 4x^2}}\)
To find the partial derivatives of the function \(f(x, y) = 3\ln(7y - 4x^2)\), we differentiate with respect to each variable while treating the other variable as a constant.
(a) To find \(f_x\), the partial derivative of \(f\) with respect to \(x\), we differentiate \(f\) with respect to \(x\) while treating \(y\) as a constant:
\[f_x(x, y) = \frac{{\partial f}}{{\partial x}} = \frac{{\partial}}{{\partial x}}\left(3\ln(7y - 4x^2)\right)\]
Using the chain rule, we have:
\[f_x(x, y) = 3 \cdot \frac{{1}}{{7y - 4x^2}} \cdot \frac{{\partial}}{{\partial x}}(7y - 4x^2)\]
\[f_x(x, y) = \frac{{-24x}}{{7y - 4x^2}}\]
Therefore, \(f_x(x, y) = \frac{{-24x}}{{7y - 4x^2}}\).
(b) To find \(f_y\), the partial derivative of \(f\) with respect to \(y\), we differentiate \(f\) with respect to \(y\) while treating \(x\) as a constant:
\[f_y(x, y) = \frac{{\partial f}}{{\partial y}} = \frac{{\partial}}{{\partial y}}\left(3\ln(7y - 4x^2)\right)\]
Using the chain rule, we have:
\[f_y(x, y) = 3 \cdot \frac{{1}}{{7y - 4x^2}} \cdot \frac{{\partial}}{{\partial y}}(7y - 4x^2)\]
\[f_y(x, y) = \frac{{7}}{{7y - 4x^2}}\]
Therefore, \(f_y(x, y) = \frac{{7}}{{7y - 4x^2}}\).
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(c) Verify that y = cos x is a solution to this differential equation. =
1. Consider the Differential Equation: -yy" + (y')2 = 1 = (a) The order of this equation is: (b) Decide whether this equation
The given differential equation is -yy" + (y')^2 = 1. The order of this equation is second order.
To verify whether y = cos(x) is a solution to this differential equation, we need to substitute y = cos(x) into the equation and check if it satisfies the equation.
The order of a differential equation is determined by the highest derivative present in the equation. In this case, the highest derivative is y", so the order of the equation is second order.
To verify if y = cos(x) is a solution to the differential equation, we substitute y = cos(x) into the equation:
-(cos(x))(cos''(x)) + (cos'(x))^2 = 1.
Taking the derivatives, we have:
cos'(x) = -sin(x) and cos''(x) = -cos(x).
Substituting these values into the equation, we get:
-(cos(x))(-cos(x)) + (-sin(x))^2 = 1.
Simplifying the equation, we have:
cos^2(x) + sin^2(x) = 1.
Since cos^2(x) + sin^2(x) = 1 is an identity, it is true for all values of x. Therefore, y = cos(x) is indeed a solution to the given differential equation.
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