-2lxl 4x)= C.e Find the c constont in terms of a by normaizing the wave function
Two waves are traveling on a string, one with a wave function, y1 = 0.05sin(4x - 200t) m and another with a wave function, a2 = 600sin(2x + 100t) m/s/s. a) Find the maximum speed of a particle on the string. b) Given the tension in the string is 10 N, find the linear mass density of the string.
Use the wave equation to find the speed of a wave given in terms of the general function h(x, t): y(x, t) = (4.10 mm)h[(34 m-1)x - (6.2 s-1)t].
c) Using Matlab function "fmincon", find the maximum and minimum of the function f(x, y) 4x + 3y g(x,y) x2 +y2 100
Find the marginal average cost function if cost and revenue are given by C(x)=158+3.6x and R(x)=4x−0.03x2. The marginal average cost function is C′(x)= nothing. Find the marginal average cost function if cost and revenue are given by C(x) = 158 + 3.6x and R(x) = 4x – 0.03x2. The marginal average cost function is '(x) = D.
Express the function as a power series, find the first 5 coefficients of the terms, and find the radius of convergence. (1 point) The function f(x) = 2x2 is represented as a power series (1-4x) f(x) = Xcnx". Find the first few coefficients in the power series. n=0 Ci = C2 = C3 = C4 = C5 = Find the radius of convergence R of the series. R=
For the function f(x) = -**-4x find the following, and use it to graph the function. Find: a) (2pts) Domain b)(2pts) Intercepts c)(2pts) Symmetry d) (2pts) Asymptotes e) 4pts) Intervals of Increase or decrease f) (2pts) Local maximum and local minimum values g)(4pts) Concavity and Points of inflection and h)(2pts) Sketch the curve
The function f is defined as follows. f(x)- 4x-3 if x21 (a) Find the domain of the function. (b) Locate any intercepts. (c) Graph the function. (d) Based on the graph, find the range. (e) Is f continuous on its domain? The function f is defined as follows. f(x)- 4x-3 if x21 (a) Find the domain of the function. (b) Locate any intercepts. (c) Graph the function. (d) Based on the graph, find the range. (e) Is f continuous on...
*Use the transformation technique* to find the density function for Y = 4X + 1. The density function for X is f(x). Your answer should be a piecewise function. f(x) = { 4e^(-4x) 0 < x < infinity 0 elsewhere
Find the derivative of the function. 4x - 7 8x + 1 y
Wave function of a harmonic oscillator at the initial moment of time t=0 has the form where . I need to find the wave function at an arbitrary time t.