please i need the question 3 for the detailed proof ! Thanks!
please i need the question 3 for the detailed proof ! Thanks! 3. For any piecewise continuous...
please i need the question 8.(a)(b) for the detailed proof and
explaination ! thanks !
Let B fE C (R, R) | f(x)> 0 for all E R (a) Is B open? If not, what is B°? (b) What is B?
Detailed proof please.
. 1. Determine whether the following statements are true or false. If one is true, provide a proof. If one is false, provide a counterexample (proving that it is in fact a counterexample). IF f is a positive continuous function on [1,00) and (f(x))2dx converges, THEN Sº f(x)dx converges. • IF f is a positive continuous function on [1,00) such that limx700 f(x) O and soon f(x)dx converges, THEN S ° (f (x))2dx converges. IF f is...
please i need the question 8.(a)(b) for the detailed proof and
explaination ! thanks !
Let B fE C (R, R) | f(x)> 0 for all E R (a) Is B open? If not, what is B°? (b) What is B?
Let B fE C (R, R) | f(x)> 0 for all E R (a) Is B open? If not, what is B°? (b) What is B?
please i need the question 9 for the detailed proof and
explaination ! thanks !
9. Let 1 fn(ar) 0 1 хи п1+ пx Show that fn0 in C([0,1], R)
9. Let 1 fn(ar) 0 1 хи п1+ пx Show that fn0 in C([0,1], R)
I need proof of this numerical analysis theorem. This theorem is
from Burden's Numerical analysis book. Please give me the detailed
solution of this theorem.
Theorem If {00, ... , ºn} is an orthogonal set of functions on an interval [a, b] with respect to the weight function w, then the least squares approximation to f on [a, b] with respect to w is 11 P(x) = a;°;(x), j=0 where, for each j = 0, 1, ... ,n, cb aj...
5. Let f(x) be periodic with fundamental period p and suppose that fand fare piecewise continuous on - p/2, p/2] (1) Show that I, 5(x?dx=a* + Ele? +6£) = Ele| This is Parseval's identity with the left hand side showing the "averaged" magnitude of f(x) over the interval (2) If f(x) is velocity, we can view that the sum of all coefficient squared as a measure of 'kinetic energy'; likewise, if f(x) represents displacement, we may view the sum of...
Question 9 3 pts The Laplace transform of the piecewise continuous function 4, 0<t <3 f(t) is given by t> 3 (2, L{f} = { (1 – 3e-*), s>0. O 2 L{f} (2 - e-st), 8 >0. 2 L{f} = (3 - e-st), s >0. O None of them 1 L{f} (1 – 2e -st), s >0.
please I need detailed explanation
The density function of a continuous random variable X is 4(9-2) 8 i 0 elsewhere Find: (a)the mean, mode and median of X. (b) the semi-interquartile range and the mean deviation of the distribution (c) the coefficient of skewness and kurtosis of the distribution.
Question 9 3 pts The Laplace transform of the piecewise continuous function J4, 0< < 3 f(t) is given by 2, t> 3 2 L{f} (2 - e-st), 8 >0. S L{f} (1 – 3e-), 8>0. 8 2 L{f} (3 - e-s), 8 >0. S L{f} = (1 – 2e-st), s > 0. None of them Question 10 3 pts yll - 4y = 16 cos 2t To find the solution of the Initial-Value Problem y(0) = 0 the y...
Dear I am struggling with this
question could you please provide a detailed answer, I will rate
it. Thank you
Consider the following periodic function f(x) with period 2. 9. a) f(x)= x. f(x)= f(x + 2) Sketch this periodic function in the interval -3sxs3 Find the Fourier series expansion of this function b) c) State the value f(0) and use it to show that (2m+1) By differentiating the series for f(x), find the Fourier series expansion of d) period...