If ∫cot⁡xsin⁡xcos⁡xdx=Pcot⁡x+Q then the value of P4 is

If cotxsinxcosxdx=Pcotx+Q then the value of P4 is

    Register to Get Free Mock Test and Study Material

    +91

    Verify OTP Code (required)

    I agree to the terms and conditions and privacy policy.

    Solution:

     Let I=cotxsinxcosxdx=cotxtanxsec2xdx=sec2x(tanx)3/2dx=2tanx+Q=2cotx+Q P=2P4=16

    Chat on WhatsApp Call Infinity Learn

      Register to Get Free Mock Test and Study Material

      +91

      Verify OTP Code (required)

      I agree to the terms and conditions and privacy policy.