We can do numerical integration using trapezoidal rule to solve the given integral.
Answer using 100 interval trapezoidal rule is -0.0654675
is the exact answer to the integral.
Please need urgently... 1 X In In X dx (1x4)4 0 1 X In In X dx (1x4)4 0
please help urgently solve number 1 #1. For a markov chain (X(n): n = 0, 1, ..} with state space {0, 1, 2, ...} and transition probability matrix P = Pial, let po be the probability mass function of X(0); that is, pli) = P(x(0) =i}. Give an expression for the probabilty mass function of X(n):
dx vx (x) = . | 0 Invalid input. Please enter a valid answer. dx (9x4 +15x9) dr a. fio (x) = 1 0 Invalid input. Please enter a valid answer. dx 3x +9 log (x) dx vx (x) = . | 0 Invalid input. Please enter a valid answer. dx (9x4 +15x9) dr a. fio (x) = 1 0 Invalid input. Please enter a valid answer. dx 3x +9 log (x)
Evaluate the integral please e dx 0. S 1 xV1+(lnln x ) dx 2
Evaluate a) integral 0 to pi (dx/5-4 cos x) b) integral 0 to infinity (dx/(1+x^2)^3)
Need it urgently Expand the function, f(x) = x cosx in a Fourier series valid on the interval -1 <x<t. You must show the details of your work neatly.
I need help with these, please simplify d. Jo 3x+2 dx 4. Group member #4 should submit only these four problems. a. S e3* sin(e3x) dx C. S dx 19-16x8 sec2(In x) b. S. 73 dx 1 1 3х
Question 2 please 1 and 2, determine whether or not the integral is In exercises improper. If it is improper, explain why 12. (a) 12 x-2/5 dx 「x-2/5 dx 「x2/5 dx (b) (c) I. (a) 0 13. (a 40 1 dx 2 x 14. (a In exercises 3-18, determine whether the integral converges or diverges. Find the value of the integral if it converges. 15. (a (b)人1x-4/3 dr 3, (a) l.lyMdx (b) x43 dx 16. (a 4. (a) 45 dx...
dx (x+ 1)(x + 3)(x+ 5)(x + 7) 0 dx (x+ 1)(x + 3)(x+ 5)(x + 7) 0
Please show steps. Given 3 dy/dx + 2xy^2 = 5x^2 - x + 1, where y(0) = 5 and using a step size of dx = 1, the value of y(1) using Euler's method is most nearly 5.333 1.010 -0.499 17.822 Given 3 dy/dx + 2xy^2 = 5x^2 - x + 1, where y(0) = 5 and using a step size of dx = 1, the value of y(1) using Runge-Kutta 4^th order method is most nearly 5.333 1.010 -0.499...
4. Find the value of x(0.3) for the coupled first order differential equations together with initial conditions dx x(0) 0 and y(0)=1 sint, dt 4. Find the value of x(0.3) for the coupled first order differential equations together with initial conditions dx x(0) 0 and y(0)=1 sint, dt