SAT Math 2 Mega Quizlet
Vertex of Quadratic
(-b/2a, f(-b/2a))
Order of a Matrix
(MxN) where m is the number of rows and n is the number of columns
a^3+b^3
(a+b)(a^2-ab+b^2)
a^3-b^3
(a-b)(a^2+ab+b^2)
Midpoint formula on a coordinate plane
(x₁+x₂)/2, (y₁+y₂)/2
Rational Root Theorem
+/- p/q Where P is the factors of the constant Q is the factors of the leading coefficient
If E is an event, then
0<= P(E) <= 1 P(not E)= 1-P(E), If P(E)=0 the event is known as an impossible event, If P(E)=1 the event is known as a certain event.
A point , (r, Θ) can be represented in different ways...
1) (r, Θ+2pi n) 2) (-r, Θ+ (2n-1)pi) n is an integer
Distance formula on a coordinate plane
2d---d = √[( x₂ - x₁)² + (y₂ - y₁)²] 3d---d =√[( x₂ - x₁)² + (y₂ - y₁)² +(z₂-z₁)²] 3d shapes √l²+w²+h²
P (A or B)
= P(A) + P(B) - P(A and B)
Types of Symmetry
A graph is.. Symmetrical to the x axis if replacing x by -x preserves the equation Symmetrical to the y axis if replacing y by -y preserves the equation Symmetrical to the origin if replacing x and u by -x and -y preserves the equation
Fundamental Theorem of Algebra
A polynomial will have as many roots as its degree
Defn Ellipse
An Ellipse is the set of all points in a plane, the sum of whose distance from two distinct fixed points (foci) is constant.
A Matrix times its inverse yields...
An identity matrix. An identity matrix times a matrix, say matrix A, yields Matrix A again.
Exponential Properties
And Xⁿ × Yⁿ = (XY)ⁿ
Identity Matrix
Any Matrix times its respective Identity Matrix will = the same Matrix
General Equation of a line
Ax+By=C
Functions with Inverses must...
Be one to one( pass vertical and horizontal Line tests.
If the power of a polynomial is even then
Both ends of the graph leave in the same directions
Even Multiplicity
Bounce on X axis
Multiplying Matrices
By a constant: Mult each term in the matrix by that constant(example, (3A- 3 times Matrix A) By another Matrix: See example image You may only multiple by another matrix if this is true: (MxN) X(NxP) =(MxP)* *Columns must equal rows*
Coefficient Matrix vs Augmented
Coefficient Matrix: Derived from the coefficients of a system of equations... no constants, no variables. Augmented Matrix:Derived from a system of equations (Coefficients and Constants)
Consistent vs Inconsistent Systems
Consistent Systems: Exactly one solution( intersection) or Infinitely many solutions ( Coinciding/same lines) Inconsistent System: No Solution(Parallel Lines
Absolute Value Function
Defined as X if x>= 0 or -X of X<0 General form Y=alx-hl +k with vertex (h,k)
Determinants and Singularity
Determinant of a square 2x2 Matrix= ad-bc The Determinants of other Matrix sizes most be found using a calculator. A Square matrix is called singular if the determinant is zero and nonsingular if its determinant is not zero. Only Nonsingular matrices have inverses. The inverse of a nonsingular,A, is defined as a square matrix A⁻¹ of the same size sich that AA⁻¹=A⁻¹A=I
Function Rule
Every X must have exactly one Y value An X value cannot have two Y Values*
Determinant Matrix
For a 2x2 see image For anything greater you must use cofactors and minors(see chapter7.7 notes).
General and Standard Forms of Circles
General Form: AX ² +BY ²+Cx+Dy=E=0 A, B ≠0 A=B Standard Form: (x-h)²+(y-k)²=r² Center (h,k) Radius:r
General and Standard forms for Parabolas
General form: AX²+BY²+Cx+Dy+E=0 A or B=0, but not both Standard form (x-h)²=4p(y-k)->opens up or down OR (y-k)²=4p(x-h) (h,k) is the vertex ** the focus lies on the axis of symmetry p units from the vertex. D
General and Standard forms of Hyperbolas
General form: AX²+BY²+Cx+Dy+E=0 A>0, B<0 OR A<0,B>0 Standard Form: see image If x² is positive there is a horizontal transverse axis(vertical conjugate axis), If y² is positive then there is a vertical Transverse axis(horizontal conjugate axis). The Transverse axis encompasses Foci, Vertices and the center a² is always under the positive variable center for both is (h,k) Vertices are a units from center Foci are c units from center *****c²=a²+b²***** Conjugate axis has a length of 2b, Transverse axis has a length of 2a Asymptotes: (y-k)= ±b/a(x-h)
General and Standard forms of Ellipses
General form: AX²+BY²+Cx+Dy+E=0 A≠B A>0, B>0 Or... A<0 , B<0 Standard form: See image a² is always the larger value, if its under (x-h)² => Horizontal Major Axis, if its under (y-k)² => Vertical Major Axis
Inverse Matrix(B)
If B is the inverse matrix Matrix A times inverse Matrix B=The Identity Matrix. *Not all square matrices have inverses *a Non square matrix will never have an inverse.
When is Matrix multiplication possible?
If Matrix A is r1 by c1, Matrix B is r2 by c2 And c1=r2 --The columns of the 1st matrix= rows of the 2nd then AB is defined and has size r1 by c2 Multiply row by column
Odd Function
If f(-x)=-f(x) for all x in its domain, the graph is symmetric about the origin and is an odd function
Even Function
If f(-x)=f(x) for all x in its domain, the graph is symmetric about the y-axis and is an even function.
Geometric Sequences and Series Equation
Nth Term: An= a₁^r (n-1) Sum of a finite series: Sn= A1(rⁿ-1)/ (r-1) Sum of an infinite series (abs(r) must be <1 then Sn= A1/(1-r)
A<0
Opens Downard
A>0
Opens Upward
P(A | B)
P (A n B)/P(B)
If the P(B) occurring is not affected by P(A) the events a re said to be independent and..
P (A n B)= P(A) x P(B)
P(A and B)
P(A) × P(B)
mutually exclusive events
P(A∩B)=0, meaning the events have no common outcomes.
Order of Processes
Reflect (Negation), Changing the Scale (Multiplication), Translation (Add/Sub)
Order of Transformations
Reflect, Change the scale, then translate.
Defn Parabola
Set of all points in a plane that are equidistant from a fixed line(directrix) and a fixed point (focus). The midpoint btwn the focus and the directrix is called the vertex. The line passing through the vertex and focus is the axis of symmetry.
Types of Square Matrices
Singular: Determinant=0 Nonsingular:Determinant doesn't =0 **Only nonsingular matrices have inverses
Arithmetic Sequences and Series Equations
Sum of a Finite Series :Sₙ=n/2(a₁+an) Nth Term: an= a1 +(n-1)d
**Sum and Product of Roots
Sum: -b/a Product: c/a
Defn Circle
The Set of all points equidistant from a given point-the center-
If the power of a polynomial is odd then
The ends of the graph leave in opposite directions
Norm of a vector
The magnitude of the vector√a²+b² Can be used to find unit vector by dividing the vector coordinates by iy.
Gauss Jordan
The process of making a matrix Reduced Row Echelon Form
Defn Hyperbolas
The set of all points in a plane, the difference of whose distance from two fixed points (foci) is a positive constant
Sample Space (Probability)
The set of all possible outcomes of an experiment.
slopes of vertical lines are _____
Undefined
Rational asymptotes vs holes
Vertical Asymptotes make only the denominator 0 (x=...) Horizontal Asymptotes follow rules If the degree of Numerator= degree of Denominator then Horizontal asymptote is the ratio between the coefficient of the numerator and denominator. (Y=...) If the degree of numerator is less than that of the denominator then the horizontal asymptote is zero If the degree of the numerator is greater than that of the denominator then the function approaches +- ∞, No HA but there are slant asymptotes. HOLES Are discontinuities that occur at a value that make both the numerator and denominator zero.
Parts of an Ellipse
Vertices, foci, and center are all on the same line(Major Axis) Major axis has a length of 2a( a is the distance from the center to either vertex). Minor axis connects center to co-vertices, has a length of 2b(b is the distance from Center to co-vertices) c is the distance from the center to either foci **c²=a²-b²**
Graph Symmetry Rules
X Axis: If replacing x by -x preserves the equation Y Axis: If replacing y by -y preserves the equations Origin: If replacing x and y by -x and -y, respectively, preserves the equation.
On an imaginary coordinate plane
X Axis= Real Part of complex number Y Axis: Imaginary part of complex number
complex number plane
X axis: Real Part, Real Units Y Axis:Imaginary Part, Imaginary Units
Important Equations for Polar
X²+Y²=R² RcosΘ=X RSinΘ=Y
Function Symmetry Rules (For all X)
Y Axis: F(x)=F(-x) X Axis: F(x)= -F(x) Origin: F(x)= -F(-x)
Log Form and Graph
Y= log b(x) All Functions pass through (1,0) IF b>1 the graph increases as x increases and approaches the y axis as an asymptote when x decreases (negative infinity). If 0<b<1, the graph decreases as x increases and approaches the y axis (infinity) as x approaches zero. The curvature of the graphs increase as the value becomes closer to zero.
Adding/ Subtracting Matrices
You may only add/subtract matrices if the matrices have the same order as one another
slopes of horizontal lines are _____
Zero
Modulus of A+Bi
a^2+b^2= Modulus^2
Law of Cosines
a²=b²+c²-2bcCosA
Odd Multiplicity
crosses the x-axis
Odd Functions
f(-x)=-f(x) origin symmetry
Even Functions
f(-x)=f(x) y-axis symmetry
vertex form of a quadratic function
f(x) = a(x-h)^2 + k
Odd Function
graph is symmetrical with respect to the origin; f(-x)=-f(x)
Even Function
graph is symmetrical with respect to the y-axis; f(x) = f(-x)
Absolute Value Transformations
if a given graph of f(x) has negative y values the absolute value will undo all the negative values flipping them over the x axis and making them positive. If f(x) <= 0 l f(x)l =-f(x) Transformations done on x values will have the same y values.
Ti Nspire greatest integer function abbrv
int(x) The greatest integer that is less than or equal to x
Triangle Cases
pgs 71-74
Polar
rcostheta=x rsintheta=y
Even/Odd Identities
sin(-θ) = -sinθ csc(-θ) = -cscθ cos(-θ) = cosθ sec(-θ) = secθ tan(-θ) = -tanθ cot(-θ) = -cotθ
Cofunction Identities
sin(π/2-θ) = cosθ cos(π/2-θ) = sinθ tan(π/2-θ) = cotθ cot(π/2-θ) = tanθ sec(π/2-θ) = cscθ csc(π/2-θ) = secθ
Law of Sines
sinA/a=sinB/b=sinC/c
Multiplicity
the number of times a value occurs as a root of the polynomial.
a function must pass the...
vertical line test
axis of symmetry
x=-b/2a
Point slope form of a line
y - y1 = m (x - x1); where (x1, y1) is a point on the line
Exponential Form
y=a^x where a>0 and a cannot equal 1. The inverse of Y=a^x is x=a^y which reads "y is the power of a that makes a" meaning y=logₙX (n=a) If a>1 then the graph increases and approaches the x axis as an asymptote as x decreases. The curvature of the graph becomes greater the greater the value of a. If 0<a<1, the graph decreases as x increases and approaches the x axis asymptote ALL GRAPHS PASS THROUGH (0,1)
slope-intercept form
y=mx+b
Vector dot product
→V dot→U =v1u1+v2u2 If V dot U is zero the vectors are perpindicular
Modulus of a complex number
√a²+b²
