Math Final- Chapters 1-5 (Big Ideas)
Parallel and perpendicular
Parallel: line that passes (3,1) and is parallel to y=3x+1 Two ways to solve; point slope or slope int.
Point slope
(3,-1);m=-2 y+1=-2(x-3)
Slope intercept
(3,5) (4,6) Find slope and write in y=mx+b form
Compound inequalities
-3<2x+5<17
Arithmatic sequence
1,3,5,7,—,—,— List the next three numbers
Standard Form
Ax+By=C
Common difference
How much is +,-,x, or divided between values in arithmatic sequence. ex) 2,4,6,8 common difference: +2
Special systems
Infinite Solutions, No Solutions, and One Solution
Formula for Slope
m=y2-y1 ------ x2-x1
Fuction notation
f(x)=3x+1
Standard Form (graphing)
x+2y=6 To find each value plug in 0
Substitution
x=2y+6 y=3x-4 Plug the x value into the y value or The other way around
Point Slope form
y-y1=m(x-x1)
Elimination
y<3x+2 y<6x+7 Make one of the variables cancel out solve for x or y then plug the x or y value into one of the original problems
Graphing
y=4x-2 y=3x+4 Graph the two lines, where they cross is the solution
Slope Intercept form
y=mx+b
Slope intercept form graphing
y=mx+b m is the slope of the line b is the the y intercept
Inequalities
y>3x y<-2-x Plug in coordinates to solve Graph the inequalities to figure out where the two lines meet
Absolute Value
|x+2|<4 Remember to make two equations, one original the other opposite; |x+2|>-4
