Calculus Fill in the blanks! Suppose f(x) is a piecewise function:f(x) = x + 3, if...

Calculus Fill in the blanks! Suppose f(x) is a piecewise function:f(x) = x + 3, if...

Calculus Fill in the blanks! Suppose f(x) is a piecewise function:f(x) = x + 3, if x ≤ 2 and f(x) = x 2 , if x > 2. Then f(2)= ——— = ——.And limx→2− f(x)= —————————– = —————————- = ———————- =—. Similarly, limx→2+ f(x)= —————————– = ————————- = ———————- =—————-. Therefore, limx→2 f(x) —- f(2).

Calculus, Taylor series Consider the function f(x) = sin(x) x . 1. Compute limx→0 f(x) using...

Calculus, Taylor series Consider the function f(x) = sin(x) x . 1. Compute limx→0 f(x) using l’Hˆopital’s rule. 2. Use Taylor’s remainder theorem to get the same result: (a) Write down P1(x), the first-order Taylor polynomial for sin(x) centered at a = 0. (b) Write down an upper bound on the absolute value of the remainder R1(x) = sin(x) − P1(x), using your knowledge about the derivatives of sin(x). (c) Express f(x) as f(x) = P1(x) x + R1(x) x...

3. For each of the piecewise-defined functions f, (i) determine whether f is 1-1; (ii) determine...

3. For each of the piecewise-defined functions f, (i) determine whether f is 1-1; (ii) determine whether f is onto. Prove your answers. (a) f : R → R by f(x) = x^2 if x ≥ 0, 2x if x < 0. (b) f : Z → Z by f(n) = n + 1 if n is even, 2n if n is odd.

Fill in the blank with “all,” “no,” or “some” to make the following statements true. •...

Fill in the blank with “all,” “no,” or “some” to make the following statements true. • If your answer is “all,” explain why. • If your answer is “no,” give an example and explain. • If your answer is “some,” give two examples, one for which the statement is true and the other for which the statement is false. Explain your examples. 1. For functions g, if lim x→a+ g(x) = 2 and lim x→a− g(x) = −2, then limx→a...

Consider the piecewise defined function f(x) = xa− xb if 0<x<1. and f(x) = lnxc if...

Consider the piecewise defined function f(x) = xa− xb if 0<x<1. and f(x) = lnxc if x≥1. where a, b, c are positive numbers chosen in such a way that f(x) is differentiable for all 0<x<∞. What can be said about a, b,  and c?

Let f(x) be defined below. f(x) = { 1 if x < 1 x 2 if...

Let f(x) be defined below. f(x) = { 1 if x < 1 x 2 if 1 < x ≤ 2 x + 1 if x > 2 Find limx→1+ f(x), limx→1− f(x), limx→1f(x), f(1) and limx→2f(x)

In calculus the curvature of a curve that is defined by a function y = f(x)...

In calculus the curvature of a curve that is defined by a function y = f(x) is defined as κ = y'' [1 + (y')2]3/2 . Find y = f(x) for which κ = 1.

fourier expansion, piecewise function. f(x){ pi , -1<x<0 -pi , 0<x<1

fourier expansion, piecewise function. f(x){ pi , -1<x<0 -pi , 0<x<1

Fill in the blanks to correctly complete the sentence below. Suppose a simple random sample of...

Fill in the blanks to correctly complete the sentence below. Suppose a simple random sample of size n is drawn from a large population with mean μ and standard deviation σ. The sampling distribution of x has mean μx=​______ and standard deviation σx=​______.

3. Fill in the blanks. The two prokaryotic domains of life, the ________________________ and the _______________________,...

3. Fill in the blanks. The two prokaryotic domains of life, the ________________________ and the _______________________, do not have nuclei. The organisms that produced most of the oxygen in the atmosphere of the early earth are called ______________________. The first person to microscopically observe and describe bacteria was _________________________________. 4.Fill in the blanks. When __________________ carry out respiration, they transfer _________________ from organic compounds to terminal electron acceptors. Phototrophs use energy from _____________________ to move electrons and generate a ___________________...