Search for: The equation of the normal to the curve y=x(2−x) at the point (2, 0) is The equation of the normal to the curve y=x(2−x) at the point (2, 0) is Ax−2y=2Bx−2y+2=0C2x+y=4D2x+y−4=0 Fill Out the Form for Expert Academic Guidance!l Grade ---Class 1Class 2Class 3Class 4Class 5Class 6Class 7Class 8Class 9Class 10Class 11Class 12 Target Exam JEENEETCBSE +91 Preferred time slot for the call ---9 am10 am11 am12 pm1 pm2 pm3 pm4 pm5 pm6 pm7 pm8pm9 pm10pm Please indicate your interest Live ClassesBooksTest SeriesSelf Learning Language ---EnglishHindiMarathiTamilTeluguMalayalam Are you a Sri Chaitanya student? NoYes Verify OTP Code (required) I agree to the terms and conditions and privacy policy. Solution:The equation of the curve is y=x(2−x) or, y=2x−x2⇒dydx=2−2x⇒dydx(2,0)=2−2×2=−|2|So, the equation of the normal at (2, 0) isy−0=−1−2(x−2) or, 2y=x−2 Related content VITEEE Result 2024 Announce on the official website – viteee.vit.ac.in NEET Marks vs Rank 2024 – Check NEET Rank vs Marks vs Percentile Analysis Complex Numbers Class 11 Worksheet with Answers CBSE 12th Result 2024 (Out) Today, How to check CBSE Class 12 Marks @cbseresults.nic.in How to use NEET UG College Predictor 2024 to find your dream Medical College Is a Gap Certificate for NEET Repeaters Necessary? General Knowledge Questions With Answers on Islamic CBSE Class 10 Worksheets NEET Rank Predictor 2024: Calculate Your Rank by Marks Why to Choose Infinity Learn NEET Rank Predictor 2024 – The Most Accurate NEET Rank Predictor