∫ (3 sin T + 1 / 2 sin ^ 2 T) DT
The title is ∫ [1 / (3sint + Sin & # 178; t)] DT or ∫ [3sint + Sin & # 178; (1 / T)] DT, please explain, otherwise I can't help you
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- 1. D / dt ∫ sin (T ^ 2) DT (0 to 1),
- 2. To find the symmetry center of G (x) = 2 + X + sin (x + 1) requires specific steps and processes. Thank you!
- 3. Let f (x) be a differentiable function, definite integral (x, 0) (t-1) f (x-t) DT = 0, find f (x)
- 4. Finding the definite integral of (1 + T square) from x square to x cube under D / DX times ∫ DT / root sign
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- 7. We know the equation x2-2ax + a = 4 about X When we find the value of 1. A, the equation has two positive values? 2. What is the value of a, the equation has two different sign roots, and the absolute value of negative root is larger? 3. What is the value of a when at least one root of the equation is zero?
- 8. If factorization x2 + 2ax-3a2 is divisible by X-1, then the value of a is (a) 1 or - 1 / 3 (b) - 1 or - 1 / 3 (c) 0 (d) 1 or - 1
- 9. A = (- 1,1) B = (the square of x|x-2ax + B = 0) if a contains B, then the value of a and B? Let's ask the value of AB when B is an empty set A = (- 1,1) B = (the square of X | X - 2aX + B = 0) if a contains B, then the value of a and B? Let's ask the value of AB when B is an empty set
- 10. Let set a = {- 1,1} set B = {x ^ 2-2ax + B = 0} if B ≠ empty set B is contained in a, find the value of a and B
- 11. Calculation: definite integral ∫ (in the upper 1, in the lower √ 2 / 2) (√ 1-x ^ 2) / x ^ 2 DX to find the detailed process answer, please God
- 12. Find: definite integral ∫ (0 above, T below) (e ^ - x ^ 2) (t above, T below) DX
- 13. Find: definite integral ∫ ((0, t) e ^ - x ^ 2 DX) (T
- 14. In the derivation process of [∫ (0, x) TF (T) DT] 'explained by experts, the result should be XF (x), or XF (x) -∫ (0, x) f (T) DT
- 15. If f (x) has continuous derivatives in [1, + ∞), and satisfies X-1 + X ∫ (upper limit x, lower limit 1) f (T) DT = (x + 1) ∫ (upper limit x, lower limit 1) TF (T) DT, find f (x) The answer is f (x) = x ^ (- 3) * e ^ (1-1 / x),
- 16. Definite integral T ^ (n-1) * f (x ^ N-t ^ n) upper limit x lower limit 0
- 17. Finding the derivative of F (x) = sin ^ 3 · 1 / X
- 18. If f (x) is continuous and f (x) = x + (x ^ 2) ∫ (0,1) f (T) DT, find f (x)
- 19. The definite integral of the original function of the square of xsinx
- 20. It is proved that the continuous function f (x) satisfies: ∫ (0 to 1) f (TX) DT = f (x) + xsinx