Math 122 Test 3. April 17, 2018
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1 SI: Math Test 3 April 7, 08 EF: Total Name Directions:. No books, notes or April showers. You may use a calculator to do routine arithmetic computations. You may not use your calculator to store notes or formulas. You may not share a calculator with anyone.. You should show your work, and explain how you arrived at your answers. A correct answer with no work shown (except on problems which are completely trivial) will receive no credit. If you are not sure whether you have written enough, please ask. 3. You may not make more than one attempt at a problem. If you make several attempts, you must indicate which one you want counted, or you will be penalized. 4. Numerical experiments do not count as justification. For example, computing the first few terms of a series is not enough to show the terms decrease. Computing the first few partial sums of a series is not enough to show the series converges or diverges. Plugging in numbers is not enough to justify the computation of a limit. 5. On this test, explanations count. If I can t follow what you are doing, you will not get much credit. 6. You may leave as soon as you are finished, but once you leave the exam, you may not make any changes to your exam.
2 . (0 points) Find the limit of the following sequences: (a) { sin(e n } ) e n n= (b) { + n + 3n + 4n 3 } n 3 + n + 3n + 4 n=. (0 points) If the series n= ( n n + + ) n converges, find the sum. If the series diverges, state why.
3 3. (0 points) For each of the following series, determine if it converges or diverges. For each test you use, you must name the test, perform the test, and state the conclusion you reached from that test. (a) n= n e n (b) n= n 5 n + 4. (0 points) For each of the following series, determine if it converges or diverges. For each test you use, you must name the test, perform the test, and state the conclusion you reached from that test. (a) n= e /n (b) sin(e n ) n=
4 5. (0 points) For each of the following series, determine if the following series converge absolutely, converge conditionally, or diverge. For each test you use, you must name the test, perform the test, and state the conclusion you reached from that test. (a) ( ) n n= n (b) n= ( 0) n 4 n+ (n + ) 6. (0 points) Consider the power series: n= n! (x + ) n n (a) Where is the power series centered? (b) Find the radius of convergence. (c) Find the interval of convergence.
5 7. (0 points) For f(x) = ln( + x ) (a) Write out the first four nonzero terms for the Maclaurin series for f(x) (b) Find lim x 0 ln( + x ) x 8. (0 points) For the the area of region inside both r = 4 cos θ and r = Fill in the boxes. A = ( ) dθ + ( ) dθ
6 9. (0 points) For the curve (a) Find dy dx. c(t) = (cos(t ), sin(t )) (b) Find the length of the curve for 0 t π 0. (0 points) True or False, indicate whether the following statements are true or false by circling the appropriate letter. A statement which is sometimes true and sometimes false should be marked false. a) If a n converges, then a n converges. T F n= n= b) If a n converges then n= n= a n n converges. T F c) If a n (x ) n converges at x = 4, it converges at x =. T F n= d) The vertex for the parabola y 8 = 8 (x ) is at (, 8) T F e) The foci for the ellipse ( ) ( ) x y 7 3 = are (0, 7) and (, 7) T F
7 FORMULA PAGE sin θ + cos θ = tan θ + = sec θ + cot θ = csc θ sin(α + β) = sin α cos β + cos α sin β sin(α β) = sin α cos β cos α sin β cos(α + β) = cos α cos β sin α sin β cos(α β) = cos α cos β + sin α sin β tan(α + β) = tan α + tan β tan α tan β sin cos x x = cos + cos x x = sin x = sin x cos x (sin x) = cos x (cos x) = sin x (tan x) = sec x (sec x) = sec x tan x (csc x) = csc x cot x (cot x) = csc x (e x ) = e x cosh x = ex + e x x n+ = x n f(x n) f (x n ) f (c) = f(b) f(a) b a f(c) = b f(x)dx b a a sec x dx = ln sec x + tan x + C sec 3 x dx = [sec x tan x + ln sec x + tan x ]+C csc x dx = ln csc x cot x + C e x = +x+ x! +x3 3! + = x k, for all x k! sin x = x x3 3! +x5 5! + = ( ) k x k+, for all x (k + )! cos x = x! +x4 4! + = ( ) k xk, for all x (k)! x = +x+x +x 3 +x 4 + = + = x k, < x < (ln x) = x (arcsin x) = x (arctan x) = + x (arcsec x) = x x (sinh x) = cosh x (cosh x) = sinh x sinh x = ex e x
8 NAME STATEMENT COMMENTS Geometric Series ar k Converges if r < and has sum S = Diverges if r a r p-series k= k p Converges if p >, diverges if p Divergence Test If lim k a k 0, the a k diverges. k= If lim a k = 0, a k n k= may or may not converge. Integral Test a k be a series with positive terms, and k= let f(x) be the function that results when k is replaced by x in the formula for a k. If f is decreasing and continuous for x, then a k and f(x) dx both converge or both k= diverge. Use this test when f(x) is easy to integrate. Comparison Test a k and b k be a series with positive k= k= terms such that if a k < b k and b k converges then a k k= converges or if b k a k di- k= verges < a k and k= b k diverges then k=
9 NAME STATEMENT COMMENTS Limit Comparison Test a k and k= terms such that b k be a series with positive k= a k lim = ρ k b k Ratio Test If 0 < ρ <, then both series converge or both diverge. a k be a series with positive terms and k= suppose a k+ lim k a k = ρ a) Series converges if ρ <. b) Series diverges if ρ >. c) No conclusion if ρ =. Try this test when a k involves factorials or k- th powers. Root Test a k be a series with positive terms and k= suppose lim k k ak = ρ a) Series converges if ρ <. b) Series diverges if ρ >. c) No conclusion if ρ =. Try this test when a k involves kth powers if a k be a series with alternating terms k= Alternating Series Test and lim a k = 0 k This test applies only to alternating series. a k > a k+ the series converges conditionally
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