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- Part 1: Limit of a difference quotient Suppose f(x) = – 5. Evaluate...
Part 1 Limit of a difference quotient 4 Evaluate the limit by using algebra to simplify...
Part 1 Limit of a difference quotient 4 Evaluate the limit by using algebra to simplify the difference quotient (in first answer box) and then evaluating the limit (in the second answer box). Suppose (2) = - 2 (7+h)-(7) 1-10) lim A0 (0)-0 0 Part 2: Interpreting the limit of a difference quotient The limit of the difference quotient (your second answer) from Part 1 above is (select all that apply). A. the slope of the tangent line to the...
5. (10 points) Let f(x) = -(9x² +6x+2). Then according to the definition of derivative f'(x)...
5. (10 points) Let f(x) = -(9x² +6x+2). Then according to the definition of derivative f'(x) = lim h0 (Your answer above and the next few answers below will involve the variables x and h. We are using h instead of Ar because it is easier to type) We can cancel the common factor — from the numerator and denominator leaving the polynomial Taking the limit of this expression gives us f'(x) = 6. (10 points) Let f(x) = x3...
Evaluate the difference quotient and simplify the result. 1 f(x) X + 5 f(x + Ax)...
Evaluate the difference quotient and simplify the result. 1 f(x) X + 5 f(x + Ax) – f(x) ΔΧ
2. Use the limit theorems to find the following limit. r? +10x + 25 lim x+5...
2. Use the limit theorems to find the following limit. r? +10x + 25 lim x+5 Using the definition of the derivative, find f'(x) for the following function. 3. f(x) = x2 + x - 1 the definition of the derivative f(x+h)-f(x) f'(x) = {im What is the slope of tangent line to this curve at x =-1?
#23. Use the limit definition of the derivative to show why f(x) = (x - 5)...
#23. Use the limit definition of the derivative to show why f(x) = (x - 5) is NOT differentiable at x = 5. (Hint: Compare the left- and right-hand limits of lim nits of lim f(5+h)-f(5) 102.) Is f(x) = (x - 5)% continuous at x = 5? What does the tangent line at the point (5,0) look like? 0
(5 pts) Let f(x)=-3x? +5x+2. Evaluate and fully simplify the difference quotient f(x+h)-f(x) h You must...
(5 pts) Let f(x)=-3x? +5x+2. Evaluate and fully simplify the difference quotient f(x+h)-f(x) h You must show all work to receive credit.
Evaluate the difference quotient for the given function. Simplify your answer. f(x) = x2 + 3, ...
Evaluate the difference quotient for the given function. Simplify your answer. f(x) = x2 + 3, f(4 + h) − f(4) h
Evaluate the difference quotient for the given function
Evaluate the difference quotient for the given function. Simplify your answer. f(x) = 3 + 5x − x2, f(4 + h) − f(4) h
**please note the limit definition has an "a"** 1. (5 points) Use the limit definition to...
**please note the limit
definition has an "a"**
1. (5 points) Use the limit definition to find the derivative of f(x) = 3x2 – 2+1 at x = 4. Show all steps and setup f(a+h)-f(a) lim h h0
Let f(2) V4.1 +3. f(0) - f(a) Using the definition of derivative at a point, f'(a)...
Let f(2) V4.1 +3. f(0) - f(a) Using the definition of derivative at a point, f'(a) = lim enter the expression needed to find the derivative at = 1. > - a f'(1) = lim 11 After evaluating this limit, we see that f'(1) = Finally, the equation of the tangent line to f(x) where x = 1 is Enter here (using math notation or by attaching in an image) an explanation of your solution. Edit - Insert Formats BI...
Part 1 Limit of a difference quotient 4 Evaluate the limit by using algebra to simplify the difference quotient (in first answer box) and then evaluating the limit (in the second answer box). Suppose (2) = - 2 (7+h)-(7) 1-10) lim A0 (0)-0 0 Part 2: Interpreting the limit of a difference quotient The limit of the difference quotient (your second answer) from Part 1 above is (select all that apply). A. the slope of the tangent line to the...
5. (10 points) Let f(x) = -(9x² +6x+2). Then according to the definition of derivative f'(x) = lim h0 (Your answer above and the next few answers below will involve the variables x and h. We are using h instead of Ar because it is easier to type) We can cancel the common factor — from the numerator and denominator leaving the polynomial Taking the limit of this expression gives us f'(x) = 6. (10 points) Let f(x) = x3...
Evaluate the difference quotient and simplify the result. 1 f(x) X + 5 f(x + Ax) – f(x) ΔΧ
2. Use the limit theorems to find the following limit. r? +10x + 25 lim x+5 Using the definition of the derivative, find f'(x) for the following function. 3. f(x) = x2 + x - 1 the definition of the derivative f(x+h)-f(x) f'(x) = {im What is the slope of tangent line to this curve at x =-1?
#23. Use the limit definition of the derivative to show why f(x) = (x - 5) is NOT differentiable at x = 5. (Hint: Compare the left- and right-hand limits of lim nits of lim f(5+h)-f(5) 102.) Is f(x) = (x - 5)% continuous at x = 5? What does the tangent line at the point (5,0) look like? 0
(5 pts) Let f(x)=-3x? +5x+2. Evaluate and fully simplify the difference quotient f(x+h)-f(x) h You must show all work to receive credit.
**please note the limit
definition has an "a"**
1. (5 points) Use the limit definition to find the derivative of f(x) = 3x2 – 2+1 at x = 4. Show all steps and setup f(a+h)-f(a) lim h h0
Let f(2) V4.1 +3. f(0) - f(a) Using the definition of derivative at a point, f'(a) = lim enter the expression needed to find the derivative at = 1. > - a f'(1) = lim 11 After evaluating this limit, we see that f'(1) = Finally, the equation of the tangent line to f(x) where x = 1 is Enter here (using math notation or by attaching in an image) an explanation of your solution. Edit - Insert Formats BI...
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