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Calculus

memorize.aimemorize.ai (lvl 286)
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8 cards
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Section 1

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Squeeze Theorem

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CalculusMath
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Last updated

6 years ago

Date created

Mar 14, 2020

Cards (8)

Section 1

(8 cards)

Squeeze Theorem

Front

Back

Intermediate Value Theorem

Front

Back

Second derivative test

Front

Test for local min/max. Since f is ____at x=_____, then by the second derivative test, f has a local _______at x=________.

Back

First derivative test

Front

Test for local min/max. Since f' changed from ______ to ______ at x=____, then by the 1st derivative test, f has a local_____at x=____.

Back

Inverse sin

Front

1/square root 1-x^2

Back

Mean Value Theorem

Front

If f is continuous on [a,b] and differentiable on the interval (a,b), then there is at least one point c in (a,b) such that f(b) - f(a)/b-a = f'(c).

Back

Inverse secant

Front

1/lxl•square root of x^2-1

Back

Inverse tangent

Front

1/1+x^2

Back