Suppose that g(x) ≤ ƒ(x) ≤h(x) for all x ≠ 2 and suppose that limx➡️2 g(x) = limx➡️2 h(x) = -5. - YouTube Music.mp3 Cepat, Mudah dan Gratis 01:40 • 18 Juli 2021
Lagu Terkait Ken Lee Funniest Audition Ever | Idols Global | English Subtitles 4.9M • 1:30 Find the local extrema of each function on the given interval 59. ƒ(x) = √3 cos x + sin x, 0 ≤ x ≤2π 233 • 4:03 find the absolute maximum and minimum values21. ƒ(x) = (2/3) x - 5, -2 ≤ x ≤ 3;22.ƒ(x)=-x-4,-4≤x≤1 1.1K • 1:46 Find the areas of the shaded regions in Exercises 61–64. 2.1K • 3:59 17. Faster than a calculator Use the approximation (1 + x)^k ≈1 + kx to estimate a. (1.0002)^50 1.2K • 0:57 study tips that ACTUALLY work 137K • 5:59 Mariah Carey see The Ken Lee performance of Valentina Hasan 1.1M • 1:31 Simply explained! KAN: Kolmogorov–Arnold Networks is interpretable! Mathematics and Physics 8.4K • 6:47 In Exercises 1–6,find dy/dx.1.y = -10x + 3cos x 2. y = 3/x + 5 sin x 3. y = x^2 cos x 4.y=2xsecx+3 1.9K • 2:16 graph the integrands and use known area formulas to evaluate the integrals.17. 3∫-3 √(9 - x^2) dx 1.5K • 0:54 29. A draining hemispherical reservoir Water is flowing at the rate of 6 m^3/min from a reservoir 3.6K • 2:47 Find the value or values of c that satisfy the equation 1.ƒ(x)=x^2+2x-1,[0,1]2.ƒ(x)=x^(2/3),[0,1] 1.9K • 1:44 In Exercises 1–8, given y = ƒ(u) and u = g(x), find dy/dx = ƒ′(g(x))g′(x). 1. y = 6u - 9,u=(1/2)x^4 3.2K • 5:25 In Exercises 7–12, find the indicated derivatives. 5K • 10:12 9. Suppose that ƒ an d g are integrable and that2∫1ƒ(x) dx = -4, 5∫1ƒ(x) dx = 6, 5∫1 g(x) dx = 8. 2.4K • 1:59 68. The linearization of log3 xa. Find the linearization of ƒ(x) = log3 x at x = 3. Then round 18 • 1:01 Find the derivatives of the functions in Exercises 17–40. ex 21-24 1.3K • 2:54 In Exercises 11–14, match the table with a graph. 407 • 2:52 Use l’Hôpital’s rule to find the limits 39.limx➡️0+ (ln x)^2/ln sinx) 40. limx➡️0+ ((3x+1)/x-1/sinx) 660 • 4:04 73. Use the Max-Min Inequality to find upper and lower bounds for the value of 1∫0 1/(1 + x^2) dx. 3.7K • 2:19 In Exercises 27–32, find dp/dq.27. p = 5 + 1/cot q28. p = (1 + csc q) cos q29. p=(sin q+cos q)/cos q 2.2K • 6:55