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| | <math>\begin{array}{rcl} | | <math>\begin{array}{rcl} |
| | \int y\, dx & = & \int3x^{2}-12x+8\, dx\\ | | \int y\, dx & = & \int3x^{2}-12x+8\, dx\\ |
| | + | \\ |
| | & = & 3\cdot \frac{x^3}{3}-12\cdot \frac{x^2}{2}+8x+C\\ | | & = & 3\cdot \frac{x^3}{3}-12\cdot \frac{x^2}{2}+8x+C\\ |
| − | & = & x^3-6x^2+8x+C.\end{array}</math>
| + | \\ |
| | + | & = & x^3-6x^2+8x+C.\end{array}</math> |
| | |- | | |- |
| | |Do <u>'''not'''</u> forget the constant when evaluating an antiderivative (i.e., an integral without upper and lower bounds)! | | |Do <u>'''not'''</u> forget the constant when evaluating an antiderivative (i.e., an integral without upper and lower bounds)! |
Revision as of 14:45, 15 May 2015
Find the antiderivative of 
| ExpandFoundations:
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| We only require some fundamental rules for antiderivatives/integrals. We have the power rule:
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 for 
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| Also, like derivatives, multiplication by a constant and addition/subtraction are respected by the antiderivative:
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| ExpandSolution:
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| We can apply the rules listed above to find
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| Do not forget the constant when evaluating an antiderivative (i.e., an integral without upper and lower bounds)!
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| ExpandFinal Answer:
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