Home
Class 12
MATHS
Evaluate the following integrals by chan...

Evaluate the following integrals by changing the limits of integration after suitable subsitutions:
`underset(-1)overset(1)intx^3(x^4+1)^3dx`

Promotional Banner

Topper's Solved these Questions

  • INTEGRALS

    MODERN PUBLICATION|Exercise EXERCISE|768 Videos

  • EXCLUSIVELY FOR JEE(ADVANCED)

    MODERN PUBLICATION|Exercise EXERCISE|38 Videos

  • INVERSE-TRIGONOMETRIC FUNCTIONS

    MODERN PUBLICATION|Exercise EXERCISE|111 Videos

Similar Questions

Explore conceptually related problems

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset(0)overset(1)int(x)/(x^2+1)dx

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset(0)overset(1)int(x^2)/(1+x^6)dx

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset(0)overset(1)intxsqrt(1-x^2)dx

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset(0)overset(2)int(6x+3)/(x^2+4)dx

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset((1//3)overset(1)int((x-x^3)^(1//3))/(x^4)dx

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset(1)overset(2)int5xsqrt(5-x^2)dx

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset(0)overset(2)intxsqrt(x+2)dx

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset(1)overset(2)int(1)/(x(1+logx)^2)dx

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset(0)overset(pi)int(dx)/(5+3cosx)

Evaluate the following integrals by changing the limits of integration after suitable subsitutions: underset(0)overset(1)int(e^x)/(1+e^2x)dx

MODERN PUBLICATION-INTEGRALS-EXERCISE
  1. For each of the following paris of function f(x) and g(x), verify that...

    Text Solution

    |

  2. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  3. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  4. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  5. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  6. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  7. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  8. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  9. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  10. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  11. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  12. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  13. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  14. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  15. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  16. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  17. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  18. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  19. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |

  20. Evaluate the following integrals by changing the limits of integration...

    Text Solution

    |