FP2 Flashcards

1
Q

What is sin⍺cosβ equal to

A

0.5 (sin(⍺+β) + sin(⍺-β))

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2
Q

What is sin(⍺)sin(β) equal to?

A

0.5(cos(⍺-β)-cos(⍺+β))

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3
Q

What is cos(⍺)cos(β) equal to?

A

0.5(cos(⍺-β)+cos(⍺+β))

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4
Q

in what form do you put cos²x for integration?

A

(cos 2x +1) /2

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5
Q

in what form do you put sin²x for integration?

A

(1-cos2x)/2

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6
Q

what is arccot(x) equal to?

A

arctan(1/x).true for other trig functions.

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7
Q

What is x equal to when converting to polar form?

A

r*cos theta

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8
Q

what is sinθ equal to when converting to Cartesian form?

A

y/r

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9
Q

what is x² +y² equal to when converting to polar form

A

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10
Q

what is tanθ equal to when converting to polar form

A

y/x

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11
Q

how is the area of a polar graph found?

A

intergrate 0.5 r²

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12
Q

What does r=a*secθ represent?

A

a straight vertical line

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13
Q

what does r=a*cosecθ represent

A

a straight horizontal line

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14
Q

what is the general solution to sinx=y

A

x=nπ+(-1)^n*arcsin(y)

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15
Q

what is the general solution to cosx=y

A

x=2nπ±arcos(y)

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16
Q

what is the general solution to tan(x)=y

A

x=nπ+arctan(y)

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17
Q

what is the principle polar co-ordinate ?

A

r is greater than 0 and -π

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18
Q

What is tanh(x) equal to?

A

Sinh(x)/cosh(x)

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19
Q

What is coth x

A

1/ tanh x

20
Q

What is sech x

A

1/cosh x

21
Q

What is cosech x

A

1/sinh x

22
Q

If you have the matrices A and B and the in verses of each, what is (AB)⁻¹ equal to?

A

(AB)⁻¹ = B⁻¹ * A⁻¹

23
Q

What are the 2 identities used to lower the powers of hyperbolic functions?

A

2sinh²(x) = cosh(2x)-12cosh²(x)= cosh(2x)+1

24
Q

What is the trace of a matrix and how does this relate to eigenvectors?

A

The trace is the sum of the leading diagonal and this equals the sum of the eigenvectors.

25
Q

How do you express a+bi in the form re^i⊝?

A

r is |a+bi|⊝= arg(a+bi)

26
Q

What is polar form?

A

Z=r(cos⊝+isin⊝)

27
Q

How do you multiply numbers in polar form?

A

r of the product is the r₁×r₂⊝ of the product = ⊝₁+⊝₂

28
Q

What is de moivre’s theorem?

A

(Cos⊝+isin⊝)ª= cos a⊝ +isin a⊝

29
Q

What is arg(iz)?

A

Arg(z) +0.5π

30
Q

What happens to the determinant if you swap two columns?

A

The sign is reversed.

31
Q

How does a cyclic interchange affect the determinant?

A

It doesn’t

32
Q

If a matrix has two identical columns, what is the determinant?

A

0

33
Q

If you multiply one column of a matrix by K, what happens to the determinant?

A

Multiplied by KIf you multiply every column by a constant the determinant is multiplied by all the constants.

34
Q

What is adj(M)?

A

The inverse of the matrix but with out being divided by the determinant

35
Q

What is a cheaf ?

A

Line where three planes meet

36
Q

What is the relationship between eigenvectors and eigenvalues.

A

(M^n)* vector =(value^n)*vector

37
Q

How do you find eigen values?

A

Find the solutions to the characteristic equation.

38
Q

How do you find eigen vectors from a characteristic equation?

A

Subtract the eigen value from the leading diagonalMultiply be x,y,zRearrange the equations.

39
Q

How do you find S and ¥ such that S¥S^-1 =M

A

Find eigen values for MFind corresponding vectorsPut the vectors together for SPut values in diagonal for ¥Make sure vectors and values are in same order.

40
Q

If you have to find M to a power but know ¥ and S, what do you do?

A

Just put ¥ to that power and multiply by S and S^-1

41
Q

How is the determinant of a matrix found from the characteristic equation?

A

It is the negative of the constant at the end provided the x³ term is positive.

42
Q

What substitution would you use to integrate 1÷ (a+bx²)

A

X(b)^0.5 = tan(theta)

43
Q

What substition would you use to integrate (a² -x²)^0.5

A

X=asin(theta)

44
Q

What substition would you use to integrate (a²+x²)^0.5?

A

x =a sinh

45
Q

What substition would you use to integrate (x²-a²)^0.5

A

X= a*cosh

46
Q

What substitution would you use to intergrate (x²+1)^0.5

A

U= sinh(x)

47
Q

What would you substitute intergrate (a²-x²)^-1.5 ?

A

X=2sin theta X=2cos theta