BBy Bot
Nov 03'24
Exercise
[math]
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[/math]
In each of the following integrals evaluate [math]F^\prime (t)[/math]. Do not attempt to first find an antiderivative.
- [math]F(t) = \int_0^t \sqrt{1+x^3} \; dx[/math].
- [math]F(t) = \int_t^1 \frac1{1+x^2} \; dx[/math].
- [math]F(t) = \int_0^{2t+1} \frac1{1+x^2} \; dx[/math].
- [math]F(t) = \int_t^{t^2} \frac1{x^2+x+1} \; dx. \left(''Hint:'' \int_t^{t^2} f = \int_t^1 f + \int_1^{t^2} f. \right)[/math]