(1 point) Find the derivative of the following function F(x) = (2t – – 1)³ dt
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Q: * نقطة واحد The value X1 .1 -2 x1 + 6 x2 + x3 = 9 - x1 + x2 + 7 x3 = -6 4X1 — Х2 — Хз %3D 3 إجابتك
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A: This is a problem of Numerical Analysis.
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- find the general solution of the equation Indicate the open version of the derivative operators step by stepA. Find the derivative of a composite function using the Chain Rule or General Power Rule. 1.) y=(3x+1)³ 2.) y=2(2x+1)⁴ 3.) y= √(3-t) 4.) y= 1/(x-1) 5.) y= x/(√x²-1) 6.) y= ((2x+1)²+1)³ 7.) y=^3√(2x+3) 8.) y= (3x+1)⅔Give an example of a function f (x) that has one positive derivatives on the range (−1, 0) and a negative derivatives on the range (0, 1).
- 2-22 Differentiate the function: f(x) = log10(√x ) ? Please show work along with the rule used for derivatives of logs - Thank you!Use part one of the fundamental theorem of calculus to find the derivative of the function (The variables are “t” if it’s hard to see)Find the derivative of a composite function using the Chain Rule or General Power Rule. 1.) y= √(x²-3x+3) 2.) y= ^3√(2x+3) 3.) y= ((2x+1)²+1 )^³ 4.) y= (3x+ 1)^ ⅔ Thank you:')
- Find the derivative using the chain rule: x(x^2+1)^(-1/2)Give an example of a function f (x) that has one positive derivative on (−1,0) and a negative derivative on (0,1).Two equivalent forms of the Chain Rule for calculating the derivative of y = ƒ(g(x)) are presented in this section. State both forms.
- Find and evaulate the derivative of the function at the given point. The point is (0,-2)2. Use part 1 of the Fundamental Theorem of Calculus to find the derivative of the following functions.5. Why does it make graphical sense that the derivative of aconstant is zero? That the derivative of the identity function is constantly equal to 1? That the derivative of a linearfunction f(x) = mx + b is equal to m?