Find thge first 2 terms of the asymptotic expansions, for large x, of the following integral:
Find the first 2 terms of the asymptotic expansions, for large
x, of the following integral:
(c) e-e) dt
(c) e-e) dt
3. Find the asymptotic expansion of (x, p)-| e-"u-pdu, for large values of x
3. Find the asymptotic expansion of (x, p)-| e-"u-pdu, for large values of x
Differentiate the function f(x) = $* V t2 + +5 dt Find the definite integral (4 sint – 2 cos t)dt Find the indefinite integral. / (tan an x – 3)' sec? x dx
please answer both!!!
(1 point) Use the binomial series to find the first 5 nonzero terms of the power series centered at x = 0 for the following function and then give the open interval of convergence for the full power series. 1 f(x) = (5 + x)5 f(x) = + + + + ... + (Give your The open interval of convergence is: answer in interval notation.) (1 point) For the following indefinite integral, find the full power series...
Find the half-range cosine and sine expansions of the given function, leaving your answers in terms of cos(n π/2) and sin(n π/2) F(x) cos nx n-1 1 sin nx Submit
Find the half-range cosine and sine expansions of the given function, leaving your answers in terms of cos(n π/2) and sin(n π/2) F(x) cos nx n-1 1 sin nx Submit
1. Set up, but do not evaluate, an integral to find the area enclosed by the x-axis and the [x = 1 + et curve ly = t-t2 2. {*5+?2t Osts2 y = VE (1) Find the equation of the tangent line at the point where t = (2) Set up, but do NOT evaluate, an integral to find the area of the surface obtained by rotating the curve about the y-axis. 3. Set up but do NOT evaluate an...
Example 3: The Growth of Functionsand Asymptotic notation a) Show that x is O(x )but that r is not O(x b) Give as good a big-O estimate as possible for each of the following (A formal proof is not required, but give your reasoning): log,n! 7n n +nlo 3n2 +2n+4 . (n log, (log,n") 2 42" c) Which of the functions in part b) above has the fastest growth rate? d) Show that if f(x) is Ollog, x)where b>1, and...
Find dx for the following integral. 0 dt } 1+P tan x dy dx (Simplify your answer.)
#2
1. Find expansions of in powers of z +1, -1, and a respectively, in O< 12 +11 < 2,0 < 12 - 11 < 2, 12/> 1. 2. Find the Laurent expansion for sin(1/2) in powers of z. Where is it valid? 3. Prove that if f(x) is analytic at zo where it has a zero of order m, then 1/f(x) has a pole of order m at zo.
Order the following functions by asymptotic growth rate: 4n, 2^log(n), 4nlog(n)+2n, 2^10, 3n+100log(n), 2^n, n^2+10n, n^3, nlog(n) You should state the asymptotic growth rate for each function in terms of Big-Oh and also explicitly order those functions that have the same asymptotic growth rate among themselves.