Apply Leibniz theorem to find (x^3.e^x)^10 and (cos x . sinh x)^4

4. Given L {sinh (-4t)} = -(4/ (s2 -16)), find L{ t sinh (-4t) } 5....

4. Given L {sinh (-4t)} = -(4/ (s2 -16)), find L{ t sinh (-4t) } 5. Given y''(t) + 3y(t) = e-2t cos t and y(0) = -1, y'(0), find L { y(t) }

for the equation f(x) = e^x - cos(x) + 2x - 3 Use Intermediate Value Theorem...

for the equation f(x) = e^x - cos(x) + 2x - 3 Use Intermediate Value Theorem to show there is at least one solution. Then use Mean Value Theorem to show there is at MOST one solution

For the given function u(x, y) = cos(ax) sinh(3y),(a > 0); (a) Find the value of...

For the given function u(x, y) = cos(ax) sinh(3y),(a > 0); (a) Find the value of a such that u(x, y) is harmonic. (b) Find the harmonic conjugate of u(x, y) as v(x, y). (c) Find the analytic function f(z) = u(x, y) + iv(x, y) in terms of z. (d) Find f ′′( π 4 − i) =?

Find a formula for sinh(3x) that only uses sinh(x) Hint: sinh(3x)= sinh(2x + x)

Find a formula for sinh(3x) that only uses sinh(x) Hint: sinh(3x)= sinh(2x + x)

Find the derivative. f(x) = tanh(4 + e5x) Find the derivative. f(x) = x sinh(x) −...

Find the derivative. f(x) = tanh(4 + e5x) Find the derivative. f(x) = x sinh(x) − 4 cosh(x)

Consider the Contraction Mapping Fixed Point Theorem,CMFP Show that cos(x) satisfies the conditions of the theorem...

Consider the Contraction Mapping Fixed Point Theorem,CMFP Show that cos(x) satisfies the conditions of the theorem on the interval [.6,.9]. In the process show that Abs[cos'[x]]<=4/5<1 on this interval.

find g'(x) g(x)= integral (-3/4 + t + cos(Pi/4 (t^2) + t))) 0<x<3

find g'(x) g(x)= integral (-3/4 + t + cos(Pi/4 (t^2) + t))) 0<x<3

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|.

Determine whether the Mean Value Theorem applies to f(x) = cos(3x) on [− π 2 ,...

Determine whether the Mean Value Theorem applies to f(x) = cos(3x) on [− π 2 , π 2 ]. Explain your answer. If it does apply, find a value x = c in (− π 2 , π 2 ) such that f 0 (c) is equal to the slope of the secant line between (− π 2 , f(− π 2 )) and ( π 2 , f( π 2 )) .

(a) Is the vector field F = <e^(−x) cos y, e^(−x) sin y> conservative? (b) If...

(a) Is the vector field F = <e^(−x) cos y, e^(−x) sin y> conservative? (b) If so, find the associated potential function φ. (c) Evaluate Integral C F*dr, where C is the straight line path from (0, 0) to (2π, 2π). (d) Write the expression for the line integral as a single integral without using the fundamental theorem of calculus.