Indefinite Integral – Quadratic polynomial in a root – Exercise 2033 Post category:Indefinite Integral Post comments:0 Comments Exercise Evaluate the integral ∫9−25x2dx\int \sqrt{9-25x^2} dx∫9−25x2dx Final Answer Show final answer ∫9−25x2dx=12x⋅9−25x2+910arcsin(53x)+c\int \sqrt{9-25x^2} dx =\frac{1}{2} x\cdot\sqrt{9-25 x^2}+\frac{9}{10}\arcsin (\frac{5}{3} x)+c ∫9−25x2dx=21x⋅9−25x2+109arcsin(35x)+c Solution Coming soon… Share with Friends Read more articles Next PostIndefinite Integral – Quadratic polynomial in a root – Exercise 2021 You Might Also Like Indefinite Integral – A quotient of exponential functions – Exercise 6387 July 7, 2019 Indefinite Integral – A multiplication of polynomials – Exercise 6382 July 7, 2019 Indefinite Integral – A rational function – Exercise 6393 July 8, 2019 Indefinite Integral – A quotient of functions with roots – Exercise 6605 July 16, 2019 Indefinite Integral – A rational function – Exercise 6398 July 8, 2019 Indefinite Integral – A polynomial to the power of a fraction – Exercise 6384 July 7, 2019 Leave a Reply Cancel replyCommentEnter your name or username to comment Enter your email address to comment Enter your website URL (optional) Δ
