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17 Cards in this Set
- Front
- Back
- 3rd side (hint)
When does a limit exist |
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Limit from the left and right |
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Definition of the greater integer function |
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Also called the floor function |
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Limit of sinx/x as x->0 |
1 |
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Limit of (1-cos^2(x))/x as x->0 |
0 |
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What is a vertical Asymptote |
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Infinite limits |
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What are horizontal asymptote |
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Limits at infinity |
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4 Algebraic limits laws |
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L+M L-M c.L L.M |
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Rational function Limit laws |
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L/M , non zero denominator |
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7 Exponent constant and absolute value limit laws |
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Limit of exponential fraction at infinity |
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1/x^1000000 |
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The on Limits of rational functions at infinity the limits of exponents at infinity |
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Limit Theorem |
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Sandwich theorem |
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Limit of sin and cos as theta tends to 0 |
0 1 |
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Prove limit of (sin x)/x = 1as x tends to 0 zero |
0 |
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Limit of sin x / x |
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Prove this limit |
Rationalize the numerator then use rules for limits |
1 - cos^2 =sin^2 |