Search for: Let f be integrable over [0, a] for any real a. If we define I1=∫0π/2 cosθ fsinθ+cos2θdθ and I2=∫0π/2 sin2θ fsinθ+cos2θdθ, then Let f be integrable over [0, a] for any real a. If we define I1=∫0π/2 cosθ fsinθ+cos2θdθ and I2=∫0π/2 sin2θ fsinθ+cos2θdθ, then AI1=I2BI1=-I2CI1=2I2DI1=-2I2 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:I1−I2=∫0π/2 (cosθ−sin2θ)fsinθ+cos2θdθput, sinθ+cos2θ=t⇒(cosθ−sin2θ)dθ=dtthen,I1−I2=∫11 f(t)dt=0∴I1=I2 Related content CBSE Class 11 English Core Writing and Grammar – Tenses Worksheet Top 10 Maths Project for Class 6 Class 10 Maths MCQs How to Download NTA NEET Admit Card 2024 Rashi And Nakshatra Quiz CBSE MCQ for Class 10 Science Genes – Definition, Structure, Diagram and its Types Octal to Binary Converter Km to cm Conversion mm to km Conversion