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33 Cards in this Set
- Front
- Back
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f(x)= cot x
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-csc^2 x
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f(x)= sec x
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sec x tan x
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f(x)= csc x
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-csc x cot x
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f(x)=cotx
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-csc^2x
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f(x)=secx
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secxtanx
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f(x)=cscx
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-cscxcotx
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f(x)=tanx
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sec^2 x
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f(x)=sin^-1x
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1/√1-x^2
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f(x)=cos^-1x
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-1/√-1-x^2
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f(x)=tan^-1x
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1/√1+x^2
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f(x)=sinh x
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cosh x
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f(x)=cosh c
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sinh x
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f(x)=lnx
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1/x
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u(x)=f(x)g(x)
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f '(x)g(x)+f(x)g'(x)
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u(x)=f(x)/g(x)
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f'(x)g(x)-f(x)g'(x)/g(x)^2
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f(x)=c
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0
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f(x)=x^n
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nx^n-1
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f(x)=a^x
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a^xlna
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f(x)=e^x
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e^x
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f(x)=cosx
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-sinx
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f(x)=sinx
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cosx
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1/a^n
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root(n, a)
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f(x)=(a/b)^n
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a^n/b^n b is not 0
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a^m/n a is +
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(1/a^n)^m and (root(n, a))^m
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a^m * a^n
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a^m+n
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a^0
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1
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a^-n
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1/a^n a is not 0
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a^-m/b^-n
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b^n/a^m a and b are not 0
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(ab)^n
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a^nb^n
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(a^m)^n
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a^mn
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(a/b)^-n
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(b/a)^n a and b are not 0
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a^m/a^n
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a^m-n a is not 0
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u(x)=f[g(x)]
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f '[g(x)]g'(x) Chain Rule
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