Determine whether each of these functions is a bijection from ℝ to ℝ. If it is, write the inverse function. f(x) = 2x3-5
Write a function using lgwt() to calculate composite Gausian quadrature using the call I = compositeGauss_integrate(Fun,a,b,n,N) where,
- Fun is the name for the function to be integrated,
- a is the lower limit of integration, b is the upper limit of integration,
- n is the number of points used in each Gaussian quadrature subintervals
- N is the number of subintervals.
Code:
function[I]=compositeGauss_integrate(Fun,a,b,n,N)% Inputs:% Fun - the function being integrated% a - the lower limit of the integration% b - the upper limit of the integration% n - the number of points used in each Gaussian quadrature subintervals% N - the number of subintervals
% Outputs:% I - value of integral
% calculate the width of each subintervalh=(b-a)/N;% calculate the endpoints of the N subintervalsxs= ;% initialize the integral valueI=0;% for each subinterval, calculate the Gaussian point locations and the weights,% then calculate the weighted sum of the evaluated function at the% Gauss points and…
1. Rank the following 10 functions by order of growth; that is, find an arrangement of the
functions satisfying f₁=2(f₂) = 2(f3) = ... = n(f10).
n1999, Vn, (n+1)/2, n!, nlogn, 22", (3-n)(3-n), 1/n, 3", 25
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Differential Equation | MIT 18.01SC Single Variable Calculus, Fall 2010; Author: MIT OpenCourseWare;https://www.youtube.com/watch?v=HaOHUfymsuk;License: Standard YouTube License, CC-BY