Exam 1, Q1: 10 (a) (77-5V5) 33 10 10n 4i lim 10 (b) 7-5) nco n 2n 3 5 (c) (7-55) 5 (d) (7-5) 2 (e) (7-5) 2 A W Exam 1, Q1: 10 (a) (77-5V5) 33 10 10n 4i lim 10 (b) 7-5) nco n 2n 3 5 (c) (7-55) 5 (d) (7-5) 2 (e) (7-5) 2 A W
(2+1) 2 Compute lim (2+1) 2 Compute lim
9-24 Evaluate the limit, if it exists. 2 - 6x + 5 9. lim 10_lim x² - 4x 3-4 x - 5 why. - 5x4+ 6 -5 2r² + 3xunt 12. lim 1-1 r2 - 2x 13. lim 21,7t + 3 14. lim -182 - 3x - 4 4 + 12 – 16 15 lim 16. lim h 0 (2 + h): - 8 h 1 + 1 - 1 h 17. lim -27 + 8 18. lim h 0
help Given that: ns lim f(x) = 1 lim f(x) = 3 x-+-9 lim g(x) = 1 lim g(x) = 0 X-9 Apply the properties of limits to solve the following problems: 1. lim (3) = 2. lim (gʻ(x) – 3f(x)g(x) – 10$(x)) = 3. lim (Vg(x) + 12) f(x) 4. lim X-9 g(x) Note: You can earn partial credit on this problem. Preview My Answers Submit Answers
Given that lim f(x) = 3, lim g(x) = 0, and lim h(x) = 5, find the limits that exist. Enter DNE if the limit doesn't exist help (limits) (a) lim f(x) + h(x)] = 8 (b) lim{f(x)} = 9 (c) lim yh(x) = 5^(1/3) help (limits) !!! help (limits) help (limits) In help (limits) help (limits) f(3) (2) (9) lim !!! help (limits) 3-a g(x) 2f(x) !! help (limits) h(x) - f(x)
R R 5. To compute 1 = lim 2 COS dr and J = lim 22+1 sinc dx simultaneously .22 +1 R R0 R R using Residue Theorem, let f(x) 22 +1 C COSC sinc (1) Show that if z = x + iy, then Rf(R2) = and Sf(R2) = x2 +1 x2 +1 (2) Find Res[f, i]. (3) Show that I = 0 and J (4) Prove I = 0) in the above problem without using Residue Theorem. IT
f(x)-3 If lim – - = 2, find lim f(x). X-5 X-3 X- 5 lim f(x) = X-5 (Type an integer or a simplified fraction.)
9, X = 3, 4, 5, and 7; compute Σ, (ΣΧ), and ΣΧ2 10. X EX --3, 0, 1, and 2; compute Σ(X-1), and D3-3 11. X-3,4,5, and 7; Y-1,0,1, and 2 compute ΣΧΥ and (DIP X-3, 4, 5, and 7; Ys-1,0,1, and 2; compute ΣΧ'ya and Σ(X-2)(Y-3) 's 4, 5, 6, and 9; Y -1,-1, 1, and 2; compute ΣΥ2 and Σ(X-5)(Y+ 1) 12. 13.
i need help in drawing this graph. 3. Draw a curve that satisfies the following conditions: lim f(x) = 5; · ·f(2) does not exist; . f'(5) does not exist; . f'() <0 on 5 < < 9; . f'(x) 0 on 2<<5 and 9< ·f"(x) < 0 on x < 2 and 2 < x < 3; ·f"(z) > 0 on 3 < z < 5 and 5 < z; 10 5 10 84 2 2 468 10 y...
3) Let lim x1 f(x) = -9 and lim x1 g(x) = -6. Find lim x1 -5f(x) - 8g(x) 3 + g(x) . 3) Let lim f(x) = -9 and lim g(x) = -6. Find lim X-1 x1 [-5f(x) - 8g(x)] 3 + g(x)