9:27 PM Mon 17 Mar . 90\% mylab.pearson.com Kurulus Osm... Can't Open P... (c) CUNY Login The Evolutio... Discord Do Homewor... MAT 220-S25 Rasheed Larry 03/17/25 9:27 PM HW Score: 33.33\%, 1 Homework: Integration using Tables Question 2, 8.6.31 of 3 points ○ Points: 0 of 1 Save Question list Question 1 Question 2 Question 3 Choose the correct answer below. A. \( \frac{1}{15}\left(\sin ^{-1} \sqrt{15 x}-\sqrt{15-225 x^{2}}\right)+C \) B. \( \frac{1}{15}\left(\sin ^{-1} \sqrt{1-15 x}-\sqrt{15 x-225 x^{2}}\right)+C \) C. \( \frac{1}{15}\left(\sin ^{-1} \sqrt{15 x}-\sqrt{15 x-225 x^{2}}\right)+C \) D. \( \frac{1}{15}\left(\cos ^{-1} \sqrt{15 x}-\sqrt{15 x-225 x^{2}}\right)+C \) Help me solve this View an example Get more help • Clear all Check answer

Did you know that integration techniques have roots in ancient civilizations? The concept of finding areas under curves dates back to the Babylonians and was further developed by Greek mathematicians like Archimedes. They laid the groundwork for integral calculus, which was formally defined much later by Newton and Leibniz in the 17th century. Talk about a longstanding tradition of discovering the mysteries of numbers! When it comes to tackling integration problems, one common mistake is overlooking the domain of the function. Always ensure the limits of your integrals don’t stray into undefined territory. Also, pay close attention to the forms of the integrals you encounter. Having a good foundation in trigonometric identities and recognizing the patterns in integrals can save you a lot of time and effort. Trust me, double-checking the integrand before diving deep into calculations can help avoid some head-scratching mishaps!