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30 Cards in this Set
- Front
- Back
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sin^2 (x)+cos^2 (x)=
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Answer: 1
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1+ tan^2 (x)=
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Answer: sec^2 (x)
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1+Cot^2 (x)=
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Answer: csc^2 (x)
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Sin^2 (u)=
used to integrate |
Answer: 1-cos (2u)
2 |
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Cos^2 (u)=
Used to integrate |
Answer: 1+Cos (2u)
2 |
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Lim Sin (x)
x->0 x |
Answer: 1 (L' Hopital)
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Lim Sin (x)
x->infinity x |
Answer: 0
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Intermediate Value theorem
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Answer: If a function is continuous between a and b, then it takes on every value between f(a) and f(b)
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Definition of derivative
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Answer: f '(x)=Lim f(x+h) - f(x)
h->0 h |
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d (uv)
dx Product rule |
Answer: uv' +vu'
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d u =
dx v Quotient rule |
Answer: vu'-uv'
v^2 |
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Derivate of sin (u) =
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Answer: Cos (u) u'
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Derivative of Cos (u) =
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Answer: -Sin (u) u'
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Derivative of tan (u)=
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Answer: sec^2 (u) u'
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Derivative of cot (u)=
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Answer: -Csc^2 (u) u'
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Derivative of Sec (u) =
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Answer: sec (u) Tan (u) u'
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Derivative of Csc (u) =
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-csc (u) Cot (u) u'
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derivative of arcsine =
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Answer: u"
rad(1-u^2) |
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derivative of arccosine=
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Answer: -u'
rad(1-u^2) |
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derivative of arctangent =
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Answer: u'
1+u^2 |
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d u =
dx v Quotient rule |
Answer: vu'-uv'
v^2 |
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Derivate of sin (u) =
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Answer: Cos (u) u'
|
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Derivative of Cos (u) =
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Answer: -Sin (u) u'
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Derivative of tan (u)=
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Answer: sec^2 (u) u'
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Derivative of cot (u)=
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Answer: -Csc^2 (u) u'
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Derivative of Sec (u) =
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Answer: sec (u) Tan (u) u'
|
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Derivative of Csc (u) =
|
-csc (u) Cot (u) u'
|
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derivative of arcsine =
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Answer: u"
rad(1-u^2) |
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derivative of arccosine=
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Answer: -u'
rad(1-u^2) |
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derivative of arctangent =
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Answer: u'
1+u^2 |
