Search for: ∫23 2x2x4+3×2+1dx is equal to ∫23 2x2x4+3x2+1dx is equal to A15tan−1754+tan−1556B25tan−1554+tan−1526C15tan−17554+tan−1556D4 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:Let,I=∫23 2x2x4+3x2+1dx=∫23 x2+1x4+3x2+1dx+∫23 x2−1dxx4+3x2+1=∫23 1+1/x2dx[x−(1/x)]2+5+∫23 1−1/x2dx[x+(1/x)]2+1In 1st put x−1x=t, in 2nd put x+1x=y I=∫3/28/3 dtt2+5+∫5/210/3 dyy2+1=15tan−1835−tan−1325+tan−1103−tan−152=15tan−17554+tan−1556 Related content Test your English Vocabulary CUET Exam Dates 2024 – Application Form, Fees, Eligibility CBSE Class 12 IP Answer Key 2024,Informatics Practices Paper Solution For SET 1, 2, 3, 4 CUET UG Cut Off 2024, Category, Universities and Colleges Wise Expected Cut Off Modal Verbs Helping Verbs Letter To Your Friend About Your School Trip Action Verbs CUET 2024 – List of Colleges and Participating Universities Accepting CUET Exam Score SRMJEEE Online Test Series – Practice Papers