EXERCISE 13.4 An Answers to Odd-Numbered Problems Begin moblems 1-28, find the derivative of each function...
Question 1 and 2. Show work please
Answers lo odd-numbered problems are at the end of the book. SECTION 2-5 Rectifiers 1. Sketch the waveforms for the load current and voltage for Figure 2-73. Show the peak values. +5 V o v 100 Ω -5 V 2. Determine the peak voltage and the peak power delivered to R, in Figure 2-74. 115 V rms 220 Ω FIGURE 2-74
PROBLEMS Answers to odd-numbered probiems are at the end of the book Section 2-1 Decimal Numbers 1. What is the weight of the digit 6 in each of the following decimal numbers? (a) 1386 (b)54,692 (c 671,920 2. Express each of the following decimal numbers as a power of ten: (a) 10 (b 100 (c) 10,000 d) 1,000,000 3. Give the value of each digit in the following decimal numbers (a) 471(b)9356 c) 125,000 4. How high can you count...
1120 Page 1 of 1. Find the derivative of the function y = + + x2 using (a) the quotient rule (b) the product rule (without using the quotient rule) (c) the power rule (without using the product rule or quotient rule) For cach, clearly show and/or explain how to use the respective rule to find the derivative. (d) Which method, (a), (b), or (e), do you think is best for finding this derivative? Why?
1. (-/1 Points] DETAILS BERRAPCALCBR7 2.4.005. Find the derivative of the function by using the Product Rule. Simplify your answer. f(x) = x (x + 1) F"(x) = Submit Answer 2. [-/1 Points] DETAILS BERRAPCALCBR7 2.4.017. Find the derivative of the function by using the Product Rule. Simplify your answer. F(X) = (7x + 4)(1 = x) f'(x) = 3. [-/1 Points) DETAILS BERRAPCALCBR7 2.4.035. Find the derivative of the function by using the Quotient Rule. Simplify your answer. f(x)...
Problem 4. Find the derivative of the faction yan" - VI Problems. Find the derivative of the function y=sin( 2.1) Problem 6. Find the derivative of the function (x) - sinh(x'). Problem 7. Find the limits. Use L'Hospital's Rule where appropriate. (a) lime (b) lim ( sinx Inx) I Problem 8. Sketch the graph of a functionſ that is continuous on [1, 5] and has absolute minimum at 2, absolute maximum at 3, local minimum at 4. Problem 9. Sketch...
Answer the two parts. Label each your answers
Find the directional derivative of the function at P in the direction of v. g(x, y) = x2 + y2, P(7, 24), v = 3i - 4j Submit Answer Find the gradient of the function at the given point. Function Point f(x, y) = x + 9y V + 1 (8, 2) 11 1 Vf8, 2) = 1316 Find the maximum value of the directional derivative at the given point.
Consider the following. 7 g(t) = 846 Find the first derivative of the function. g'(t) = Find the second derivative of the function. g"(t) = X Use the General Power Rule to find the derivative of the function. 1 y = 3 (8 - x3,8 y' = Find the derivative of the function. 3 8x 5 Y= 뉴 4-X y =
Using the Chain rule find the derivative of the function: 1. y=(x?+2x2,6
4. g(t)= 3. y=sin(tan5x) In problems 1-5, find the derivative of the function. Write your answers in simplest form. 1. f(x)=- sinx 2. f(x)=(x +7x-2) 100 1-COS X 3. y =sin(tan5x) 4. g(t)= t+3 5. f(x) = cos(x'cscx) sin(x-3) 6. Find lim 2-3 3x-x?
Using the Chain rule find the derivative of the function: 1. y=(2x²-3x+1)10