Section 5.1 : Indefinite Integrals
- Evaluate each of the following indefinite integrals.
- \(\displaystyle \int{{10{x^9} - 12{x^3} - 5\,dx}}\)
- \(\displaystyle \int{{10{x^9} - 12{x^3}\,dx - 5}}\)
- Evaluate each of the following indefinite integrals.
- \(\displaystyle \int{{{t^7} + 33{t^2} + 8t\,dt}}\)
- \(\displaystyle \int{{{t^7}\,dt}} + 33{t^2} + 8t\)
- Evaluate each of the following indefinite integrals.
- \(\displaystyle \int{{6{x^5} - 7{x^3} + 12{x^2} - 10\,dx}}\)
- \(\displaystyle \int{{6{x^5} - 7{x^3}\,dx}} + 12{x^2} - 10\)
- \(\displaystyle \int{{6{x^5}\,dx}} - 7{x^3} + 12{x^2} - 10\)
- Evaluate each of the following indefinite integrals.
- \(\displaystyle \int{{21{x^6} - 9{x^5} - {x^3} - x\,dx}}\)
- \(\displaystyle \int{{21{x^6} - 9{x^5} - {x^3}\,dx}} - x\)
- \(\displaystyle \int{{21{x^6} - 9{x^5}\,dx}} - {x^3} - x\)
For problems 5 – 9 evaluate the indefinite integral.
- \(\displaystyle \int{{8{t^5} - 15{t^2} - 1\,dt}}\)
- \(\displaystyle \int{{120{y^9} - 24{y^5} - 4{y^3}\,dy}}\)
- \(\displaystyle \int{{dw}}\)
- \(\displaystyle \int{{{x^9} + 14{x^6} - 10{x^3} + 13x\,dx}}\)
- \(\displaystyle \int{{8{x^6} - {x^4} - 7{x^2} + 11x - 12\,dx}}\)
- Determine \(f\left( x \right)\) given that \(f'\left( x \right) = 16{x^4} - 9{x^2} - x\).
- Determine \(g\left( t \right)\) given that \(g'\left( t \right) = 4{t^5} + 16{t^2} - 18t + 72\).
- Determine \(R\left( z \right)\) given that \(R'\left( z \right) = 4{z^{15}} + 121{z^{10}} + 20{z^5} + z - 4\).
- Determine \(f\left( x \right)\) given that \(f''\left( x \right) = 8{x^3} - 12x + 3\).