Show that f(x) = x sin(x) has critical point on (0,pi) by using mean value theorem.

Use the Mean Value Theorem prove that sin x ≤ x for all x > 0

Use the Mean Value Theorem prove that sin x ≤ x for all x > 0

Use the Mean Value Theorem and the fact that for f(x) = cos(x), f′(x) = −sin(x),...

Use the Mean Value Theorem and the fact that for f(x) = cos(x), f′(x) = −sin(x), to prove that, for x, y ∈ R, | cos x − cos y| ≤ |x − y|.

f is an integral from 0 to x^2 x*sin(pi*x) for x > 0 calculate f(35)

f is an integral from 0 to x^2 x*sin(pi*x) for x > 0 calculate f(35)

Use the Mean Value Theorem to prove that -x < sin(x) < x, for x >...

Use the Mean Value Theorem to prove that -x < sin(x) < x, for x > 0.

if f''(x)= -cos(x)+sin(x), and f(0)=1 and f(pi)=), what is the original function

if f''(x)= -cos(x)+sin(x), and f(0)=1 and f(pi)=), what is the original function

Estimate the area under graph f(x) = sin(x) from x = 0 to x = pi/2....

Estimate the area under graph f(x) = sin(x) from x = 0 to x = pi/2. Using 4 sub-intervals and the left endpoints. Sketch the graph and the rectangles.

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...

Show that the equation f(x) = sin(x) - 2x = 0 has exactly one solution on...

Show that the equation f(x) = sin(x) - 2x = 0 has exactly one solution on the interval [-2,2]

Calculate the Fourier Series S(x) of f(x) = sin(x/2), -pi < x < pi. What is...

Calculate the Fourier Series S(x) of f(x) = sin(x/2), -pi < x < pi. What is S(pi) = ?

Recall the Mean Value Theorem: If f : [a, b] → R is continuous on [a,...

Recall the Mean Value Theorem: If f : [a, b] → R is continuous on [a, b], and differentiable on (a, b), then there exists c ∈ (a, b) such that f(b) − f(a) = f 0 (c)(b − a). Show that this is generally not true for vector-valued functions by showing that for r(t) = costi + sin tj + tk, there is no c ∈ (0, 2π) such that r(2π) − r(0) = 2πr 0 (c).