Find the second-order partial derivative. Find fxy when f(x,y) = 8x®y - 7y2 + 2x. O A. 24x? B. 48xy O C. - 14 OD. -28
Find the particular antiderivative of the following derivative that satisfies the given condition. dy dx -3 = 2x + 8x - 1; y(1) = 0 y(x) =
1. Let Q1 = y(7), where y solves dy dx + 8x 2 = 5x, y(6) = 4. Let Q = ln(3 + |Q1|). Then T = 5 sin2 (100Q) satisfies:— (A) 0 ≤ T < 1. — (B) 1 ≤ T < 2. — (C) 2 ≤ T < 3. — (D) 3 ≤ T < 4. — (E) 4 ≤ T ≤ 5. 2. Let Q1 = y(1), where y solves dy dx + 1.7y = 5e 1.2x...
find the derivative
Find the derivative of the function. y=9 eX + e 2x dy dx
Find the derivative of the function. y=9 eX + e 2x dy dx
9) Find ( 5x+3x+3x dx a) O 5x2 + x3 + x2 + c b) O 5x3 + 2x2 + 3x + c c) O 5x3 + 2.x + 3x + с d) 0 5x + x² + x3 + c 8) Find the most general solution of the differential equation dx C49602 Weight: 1 = 6x2 - 7; given that y = 5, dy = 2, when x = dx o. a) y = PR + 2x + 5...
Evaluate 1) S(285- 783 +5) dx A) Žx6.** +8x+C c) 5x6-7x+ +5x+C B) 6x6.7** +5x+C D) 6x6_*** +5x+C 2) S (16 + ett) di ay + c tett c over the c Find the integral. 3) S (5x - 3)2 dx A) 3x3 - 15x2 +9x+C c) *_x3 - 15x2 +9x +C B) {x2 + 9x + c D) * x3 +9x+C Solve the problem. 4) Suppose that a velocity function is given by v(t) - 81. Find the position...
Find dy/dx by implicit differentiation. cot(y) = 5x – 6y dy/dx = Need Help? Read It Talk to a Tutor
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Consider the equation exin(y)+5x +1=y? Find dy dx in terms of X and y. Evaluate dx at (x,y) = (0,1). Select the correct answer. -5 5 ООО 2 Suppose that 3 xy2 = x²y + y2 + 14. dy Use implicit differentiation to find an expression for in terms of both X and y. dx dy Now give the value of when x = 3 and y = 2 dx -36 13 3 0 24 41 о ....
(a) Find the derivative. y = In(4x – 5) – 3 In(x) dy dx (b) Find the derivative. 4x - y = = In dx State whether the function in part (b) is the same function as that in part (a). The function in part (b) is the same function as that in part (a). The function in part (b) is not the same function as that in part (a).
Determine dy/dx for y=8x^3 sin^ −1x .