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15 Cards in this Set
- Front
- Back
sin(cos*-1(x))
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sr(1-x*2)
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sin(tan*-1(x))
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x/sr(1+x*2)
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cos(tan*-1(x))
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1/sr(1+x*2)
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cos(sin*-1(x))
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sr(1-x*2)
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tan(sin*-1(x))
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x/sr(1-x*2)
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tan(cos*-1(x))
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sr(1-x*2)/x
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cot(sin*-1(x))
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sr(1-x*2)/x
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cot(cos*-1(x))
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x/sr(1-x*2)
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d/dx of f*-1
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1/(f'(f*-1(x)))
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d/dx of lnx
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1/x
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d/dx of logax
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1/(lna)x
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linear approximation
L(x)= |
f(a)+f'(a)(x-a)
y=f(x) at x=a |
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extreme value theorem
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if f(x) is continuous on a,b then there is a global max and min
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fermat's theorem
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if f(x) has a local max/min at c, then f' at c=0
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mean value theorem
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if f(x) is continuous on a,b and differentiable then f' at c must exist
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