The value of sin θ with the help of right triangle.

Question

Want to see the full answer?

Answer 1

Question

Chapter 13, Problem 95RE

(a)

To determine

The value of sinθ with the help of right triangle.

(b)

To determine

The value of L2 from the result obtained in part (a).

(c)

To determine

The value of cotθ in terms of s and L0−L1.

(d)

To determine

The value of L1 from the result obtained in part (c).

(e)

To determine

An expression for R1 along the length AD.

(f)

To determine

An expression for the resistance along the length DC.

(g)

To determine

To write: An expression for the resistance R as the sum of resistance along the length AD and DC.

(h)

To determine

To replace: The expression for the resistance R with the values of L1 and L2 obtained in part (d) and (b), respectively.

(i)

To determine

The derivative of the expression R with respect to θ.

(j)

To determine

To set: The derivative of the expression R with respect to θ to zero.

(k)

To determine

To multiply: The equation obtained in part (j) by sin2θs.

(l)

To determine

The equation obtained in part (k) for cosθ.

(m)

To determine

To verify: The solution obtained in part (l) for cosθ gives a minimum.

(n)

To determine

The value of cosθ and then the value of θ.

(o)

To determine

To find: The value of cosθ and then the value of θ.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Students have asked these similar questions

The marginal revenue (in thousands of dollars) from the sale of x handheld gaming devices is given by the following function. R'(x) = 4x (x² +26,000) 2 3 (a) Find the total revenue function if the revenue from 125 devices is $17,939. (b) How many devices must be sold for a revenue of at least $50,000? (a) The total revenue function is R(x) = (Round to the nearest integer as needed.) given that the revenue from 125 devices is $17,939.

Use substitution to find the indefinite integral. S 2u √u-4 -du Describe the most appropriate substitution case and the values of u and du. Select the correct choice below and fill in the answer boxes within your choice. A. Substitute u for the quantity in the numerator. Let v = , so that dv = ( ) du. B. Substitute u for the quantity under the root. Let v = u-4, so that dv = (1) du. C. Substitute u for the quantity in the denominator. Let v = Use the substitution to evaluate the integral. so that dv= ' ( du. 2u -du= √√u-4

Use substitution to find the indefinite integral. Зи u-8 du Describe the most appropriate substitution case and the values of u and du. Select the correct choice below and fill in the answer boxes within your choice. A. Substitute u for the quantity in the numerator. Let v = , so that dv = ( ( ) du. B. Substitute u for the quantity under the root. Let v = u-8, so that dv = (1) du. C. Substitute u for the quantity in the denominator. Let v = so that dv= ( ) du. Use the substitution to evaluate the integral. S Зи -du= u-8

Answer 2

Question

Chapter 13, Problem 95RE

(a)

To determine

The value of sinθ with the help of right triangle.

(b)

To determine

The value of L2 from the result obtained in part (a).

(c)

To determine

The value of cotθ in terms of s and L0−L1.

(d)

To determine

The value of L1 from the result obtained in part (c).

(e)

To determine

An expression for R1 along the length AD.

(f)

To determine

An expression for the resistance along the length DC.

(g)

To determine

To write: An expression for the resistance R as the sum of resistance along the length AD and DC.

(h)

To determine

To replace: The expression for the resistance R with the values of L1 and L2 obtained in part (d) and (b), respectively.

(i)

To determine

The derivative of the expression R with respect to θ.

(j)

To determine

To set: The derivative of the expression R with respect to θ to zero.

(k)

To determine

To multiply: The equation obtained in part (j) by sin2θs.

(l)

To determine

The equation obtained in part (k) for cosθ.

(m)

To determine

To verify: The solution obtained in part (l) for cosθ gives a minimum.

(n)

To determine

The value of cosθ and then the value of θ.

(o)

To determine

To find: The value of cosθ and then the value of θ.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 3

Question

Chapter 13, Problem 95RE

(a)

To determine

The value of sinθ with the help of right triangle.

(b)

To determine

The value of L2 from the result obtained in part (a).

(c)

To determine

The value of cotθ in terms of s and L0−L1.

(d)

To determine

The value of L1 from the result obtained in part (c).

(e)

To determine

An expression for R1 along the length AD.

(f)

To determine

An expression for the resistance along the length DC.

(g)

To determine

To write: An expression for the resistance R as the sum of resistance along the length AD and DC.

(h)

To determine

To replace: The expression for the resistance R with the values of L1 and L2 obtained in part (d) and (b), respectively.

(i)

To determine

The derivative of the expression R with respect to θ.

(j)

To determine

To set: The derivative of the expression R with respect to θ to zero.

(k)

To determine

To multiply: The equation obtained in part (j) by sin2θs.

(l)

To determine

The equation obtained in part (k) for cosθ.

(m)

To determine

To verify: The solution obtained in part (l) for cosθ gives a minimum.

(n)

To determine

The value of cosθ and then the value of θ.

(o)

To determine

To find: The value of cosθ and then the value of θ.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 4

Question

Chapter 13, Problem 95RE

(a)

To determine

The value of sinθ with the help of right triangle.

(b)

To determine

The value of L2 from the result obtained in part (a).

(c)

To determine

The value of cotθ in terms of s and L0−L1.

(d)

To determine

The value of L1 from the result obtained in part (c).

(e)

To determine

An expression for R1 along the length AD.

(f)

To determine

An expression for the resistance along the length DC.

(g)

To determine

To write: An expression for the resistance R as the sum of resistance along the length AD and DC.

(h)

To determine

To replace: The expression for the resistance R with the values of L1 and L2 obtained in part (d) and (b), respectively.

(i)

To determine

The derivative of the expression R with respect to θ.

(j)

To determine

To set: The derivative of the expression R with respect to θ to zero.

(k)

To determine

To multiply: The equation obtained in part (j) by sin2θs.

(l)

To determine

The equation obtained in part (k) for cosθ.

(m)

To determine

To verify: The solution obtained in part (l) for cosθ gives a minimum.

(n)

To determine

The value of cosθ and then the value of θ.

(o)

To determine

To find: The value of cosθ and then the value of θ.

Expert Solution & Answer

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 5

Chapter 13, Problem 95RE

(a)

To determine

The value of sinθ with the help of right triangle.

(b)

To determine

The value of L2 from the result obtained in part (a).

(c)

To determine

The value of cotθ in terms of s and L0−L1.

(d)

To determine

The value of L1 from the result obtained in part (c).

(e)

To determine

An expression for R1 along the length AD.

(f)

To determine

An expression for the resistance along the length DC.

(g)

To determine

To write: An expression for the resistance R as the sum of resistance along the length AD and DC.

(h)

To determine

To replace: The expression for the resistance R with the values of L1 and L2 obtained in part (d) and (b), respectively.

(i)

To determine

The derivative of the expression R with respect to θ.

(j)

To determine

To set: The derivative of the expression R with respect to θ to zero.

(k)

To determine

To multiply: The equation obtained in part (j) by sin2θs.

(l)

To determine

The equation obtained in part (k) for cosθ.

(m)

To determine

To verify: The solution obtained in part (l) for cosθ gives a minimum.

(n)

To determine

The value of cosθ and then the value of θ.

(o)

To determine

To find: The value of cosθ and then the value of θ.

Answer 6

Chapter 13, Problem 95RE

(a)

To determine

The value of sinθ with the help of right triangle.

Answer 7

Chapter 13, Problem 95RE

(a)

To determine

The value of sinθ with the help of right triangle.

Answer 8

(b)

To determine

The value of L2 from the result obtained in part (a).

Answer 9

(b)

To determine

The value of L2 from the result obtained in part (a).

Answer 10

(c)

To determine

The value of cotθ in terms of s and L0−L1.

Answer 11

(c)

To determine

The value of cotθ in terms of s and L0−L1.

Answer 12

(d)

To determine

The value of L1 from the result obtained in part (c).

Answer 13

(d)

To determine

The value of L1 from the result obtained in part (c).

Answer 14

(e)

To determine

An expression for R1 along the length AD.

Answer 15

(e)

To determine

An expression for R1 along the length AD.

Answer 16

(f)

To determine

An expression for the resistance along the length DC.

Answer 17

(f)

To determine

An expression for the resistance along the length DC.

Answer 18

(g)

To determine

To write: An expression for the resistance R as the sum of resistance along the length AD and DC.

Answer 19

(g)

To determine

To write: An expression for the resistance R as the sum of resistance along the length AD and DC.

Answer 20

(h)

To determine

To replace: The expression for the resistance R with the values of L1 and L2 obtained in part (d) and (b), respectively.

Answer 21

(h)

To determine

To replace: The expression for the resistance R with the values of L1 and L2 obtained in part (d) and (b), respectively.

Answer 22

(i)

To determine

The derivative of the expression R with respect to θ.

Answer 23

(i)

To determine

The derivative of the expression R with respect to θ.

Answer 24

(j)

To determine

To set: The derivative of the expression R with respect to θ to zero.

Answer 25

(j)

To determine

To set: The derivative of the expression R with respect to θ to zero.

Answer 26

(k)

To determine

To multiply: The equation obtained in part (j) by sin2θs.

Answer 27

(k)

To determine

To multiply: The equation obtained in part (j) by sin2θs.

Answer 28

(l)

To determine

The equation obtained in part (k) for cosθ.

Answer 29

(l)

To determine

The equation obtained in part (k) for cosθ.

Answer 30

(m)

To determine

To verify: The solution obtained in part (l) for cosθ gives a minimum.

Answer 31

(m)

To determine

To verify: The solution obtained in part (l) for cosθ gives a minimum.

Answer 32

(n)

To determine

The value of cosθ and then the value of θ.

Answer 33

(n)

To determine

The value of cosθ and then the value of θ.

Answer 34

(o)

To determine

To find: The value of cosθ and then the value of θ.

Answer 35

(o)

To determine

To find: The value of cosθ and then the value of θ.

Answer 36

Expert Solution & Answer

Answer 37

Expert Solution & Answer

Answer 38

Want to see the full answer?

Check out a sample textbook solution

See solution

Answer 39

Ch. 13.1 - (a) Convert 210° to radians. (b) Convert 3π/4...Ch. 13.1 - Find the values of the six trigonometric functions...Ch. 13.1 - Prob. 3YT Ch. 13.1 - Prob. 4YT Ch. 13.1 - Find all values of θ between 0 and 2π that satisfy...Ch. 13.1 - Convert the following degree measures to radians....Ch. 13.1 - Prob. 2E Ch. 13.1 - Prob. 3E Ch. 13.1 - Convert the following degree measures to radians....Ch. 13.1 - Prob. 5E

The value of sin θ with the help of right triangle.

Videos

The value of sinθ with the help of right triangle.

The value of L2 from the result obtained in part (a).

The value of cotθ in terms of s and L0−L1.

The value of L1 from the result obtained in part (c).

An expression for R1 along the length AD.

An expression for the resistance along the length DC.

To write: An expression for the resistance R as the sum of resistance along the length AD and DC.

To replace: The expression for the resistance R with the values of L1 and L2 obtained in part (d) and (b), respectively.

The derivative of the expression R with respect to θ.

To set: The derivative of the expression R with respect to θ to zero.

To multiply: The equation obtained in part (j) by sin2θs.

The equation obtained in part (k) for cosθ.

To verify: The solution obtained in part (l) for cosθ gives a minimum.

The value of cosθ and then the value of θ.

To find: The value of cosθ and then the value of θ.

Want to see the full answer?

Chapter 13 Solutions