5.3 The Fundamental Theorem of Calculus/17: Difference between revisions

Revision as of 19:25, 25 August 2022

FTC #1- $G(x)=f^{\prime }(x)$ or in other words ${\frac {d}{dx}}\left[\int \limits _{a(x)}^{b(x)}F(x)dx\right]$ is $\ b^{\prime }(x)*f(b(x))-a^{\prime }(x)*f(a(x))$

17) $g(x)=\int \limits _{1-3x}^{1}{\frac {u^{3}}{(1+u^{2})}}du$

$g\prime (x)=(0)*f(1)-(-3)*f(1-3x)$

which is equal to $(3)*f(1-3x)$

which is= $3*{\frac {(1-3x)^{3}}{(1+(1-3x)^{2})}}$

or simplified to  ${\frac {3*(1-3x)^{3}}{(1+(1-3x)^{2})}}$

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@@ Line 1: / Line 1: @@
 FTC #1- <math>G(x)=f^\prime(x)</math>  or in other words <math>\frac{d}{dx}\left[\int\limits_{a(x)}^{b(x)}F(x)dx\right]</math> is <math>\ b^\prime(x)*f(b(x))-a^\prime(x)*f(a(x))</math>
-) <math>y=\int\limits_{1-3x}^{1}\frac{u^3}{(1+u^2)} du</math>
+) <math>g(x)=\int\limits_{1-3x}^{1}\frac{u^3}{(1+u^2)} du</math>
-so using the formula we get y=<math>(0)*f(1)-(-3)*f(1-3x)</math>
+<math>g\prime(x)=(0)*f(1)-(-3)*f(1-3x)</math>
 which is equal to <math>(3)*f(1-3x)</math>

5.3 The Fundamental Theorem of Calculus/17: Difference between revisions

Revision as of 19:25, 25 August 2022

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