Given ?(?), find ℒ{?(?)} Piecewise function: ?(?) = 0, 0 ≤ ? < 5 (? −...

For the function given, if it is not piecewise smooth on the interval, explain why not....

For the function given, if it is not piecewise smooth on the interval, explain why not. Sketch. (a) f(x) = |x| - |1-x|, -1<x<2

ℒ−1 Use appropriate algebra and Theorem 7.2.1 to find the given inverse Laplace transform. (Write your...

ℒ−1 Use appropriate algebra and Theorem 7.2.1 to find the given inverse Laplace transform. (Write your answer as a function of t.) ℒ−1 8s − 16 (s2 + s)(s2 + 1) 8s − 16 (s2 + s)(s2 + 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

Find F(s). 1. ℒ{te4t } 2. ℒ{t16e−6t} 3. ℒ{(1 − et + 6e−3t)cos(2t)} 4. ℒ-1{(1/(s-3)3 }

Find F(s). 1. ℒ{te4t } 2. ℒ{t16e−6t} 3. ℒ{(1 − et + 6e−3t)cos(2t)} 4. ℒ-1{(1/(s-3)3 }

Find the Laplace transform F(s)  =  ℒ{ f (t)} of the function  f (t)  =  (7...

Find the Laplace transform F(s)  =  ℒ{ f (t)} of the function  f (t)  =  (7 − t) [?(t − 4) − ?(t − 6)].

A piecewise-linear cumulative distribution, function associated with the data values 1, 2, and 9 can be...

A piecewise-linear cumulative distribution, function associated with the data values 1, 2, and 9 can be found by connecting the points (1,0), (2,, 1/2), and (9,1) with lines. Find a: the population mean b: the population variance c: the moment generating function of the random variable associated with this piecewise-linear cumulative distribution

1. Find k so that f(x) is a probability density function. k= ___________ f(x)= { 7k/x^5...

1. Find k so that f(x) is a probability density function. k= ___________ f(x)= { 7k/x^5 0 1 < x < infinity elsewhere 2. The probability density function of X is f(x). F(1.5)=___________ f(x) = {(1/2)x^3 - (3/8)x^2 0 0 < x < 2 elsewhere   3. F(x) is the distribution function of X. Find the probability density function of X. Give your answer as a piecewise function. F(x) = {3x^2 - 2x^3 0 0<x<1 elsewhere

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?

Graph the piecewise function. Be sure that you correctly use the open and closed dots. g(x)...

Graph the piecewise function. Be sure that you correctly use the open and closed dots. g(x) = 2 x + 11    if x < −5 2 x + 4 if −5 ≤ x ≤ 5 2 x − 3 if x > 5

The density function ofXis given by fX(x) ={a+bx^2if 0≤x≤1 0 otherwise}.If E(X) = 3/5, find a...

The density function ofXis given by fX(x) ={a+bx^2if 0≤x≤1 0 otherwise}.If E(X) = 3/5, find a and b.