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Greg Kaulius, Zach Skank, and Richie
Donahue
Points and lines
X-axis
2nd Quadrant
4th Quadrant3rd Quadrant
1st Quadrant
S(-6,4)
Y-axis
Y-axis
X-axis
S pointX-coordinate is -6 y-coordinate is 4
Ex How to Sketch 2x+5y=201st Let x=0, solve
2(0)+5y=205y=20y=4 (0,4)
Let y=o, solve2x+5(0)=202x=20x=10 (10,0)
2nd Plot the points (0,4) and (10,0)Draw a straight line between and Pick a point that lies on the line. 3rd Check points (5,2)Plug numbers into problem
2(5)+5(2)=20√
(0,4)
(10,0)
(5,2)
1st Get X to Equal(4)2x+3y=15
8x+12y=60(2)4x-9y=3
8x-18y=62nd Subtract 2 equations:
8x+12y=608x-18y=630y=54y=9/5
3rd Plug 9/5 in for Y2x+3(9/5)=15x=24/5
Point of intersection is (9/5,24/5)
Ex Find where the 2 lines intersect 2x+3y=15
4x-9y=3
AB
Ex Given C(1,0) D(7,8)1st Plug in the numbers to Distance equation
=√(7-(1))²+(8-(0)) ²
= √36+64
Distance=10
Ex Given C(3,3) D(15,12)1st Plug in numbers to Distance equation
=√(15-(3))²+(12-(3)) ²
=√144+81
Distance=15
Midpoint Formula
Ex Given C(3,3) D(15,12)1st Plug in numbers to Midpoint equation2nd Solve=(3+15,3+12)
( 2 2 )Midpoint= (9,9)
Ex Given C(1,0) D(7,8)1st Plug in the numbers to Midpoint equation2nd solve=(1+7,0+8)
( 2 2 )Midpoint=(4,4)
Slopes of Lines
Slope intercept Form
Y=mx+b
M=rise=y2-y1
run x2-x1
slope
Ex
(5,3)
(2,0)
M=3-0 =3 =1
5-2 3
Ex(0,4)
(6,0)
M=3-0 = -1
0-6 2
If a line is horizontal it was a slope of 0.
If a line is vertical it doesn’t have a slope.
2 nonvertical lines are parallel if and only if they have the same slope
Y=2x+6
Y=2x+2
Y=2x-4
2 lines are perpendicular if and only if their slopes are negative reciprocals of each other
M1= -1 , or m1xm2=-1 m2
Ex y=x+2
y=-x+3
These numbers are negative reciprocals
Finding Equations of Lines
Linear Equation Forms:The General form
Ax+By=C
The slope-intercept form
y= mx+k Line has slope m and y-int k
The point-slope
y-y1=mx-x1
Line has slope m and contains (x1,y1)
The Intercept form
x + y = 1
a b
Line has x-int a and y-int b.
Example Using intercept formFind an equation of the line with x-int 20 and y-int 8 Intercept form: x + y = 1 a b
1st since you got the x and y-int use the intercept form plug in the x and y int for a and b in Equation
x + y = 1 20 8
2nd Answer in general formx+4y=20
ExampleUsing Point-Slope formThe line through (-1,4) and (5,8) Point slope form: y-y1=m
x-x1 1st Find the slope
M= 4-(8)
-1-5
=2/3 2nd Using the point slope form plug the slope in for M and either (-
1,4) or (5,8) in for x1 and y1
When using (-1,4): When using (5,8):
y – 4 = 2 y – 8 = 2
x-(-1) 3 x – 5 3
In General Form=2x-3y=-14
ExampleUsing Slope-Intercept form The line with y-int 1.8 and parallel to .3x-1.2y=6.4
Slope-intercept form: y= mx+k
1st Write the equation .3x-1.2y=6.4 in slope-intercept form to get
y= .25x – 5.33
2nd Use the slope-int form
y= .25x + 3
3rd Answer in general form
.25x – y = -1.8
Function describes a dependent relationship between quantities
Linear Functions have the form f(x)= mx + k This is read “f” of “x”
f(x) = 3x – 5 f(2) = 1f(5/3) = 0 so we say that 5/3 is a zero of the
function f
Barbara's boat costs $700 a month for payments and insurance. Gas and maintenance cost $0.25 a mile.
a. Express total monthly cost as a function of miles
b. What is the slope of the graph of the cost function
A. C(m) = .25m + 700
B. Slope = .25 = 1/4
Section 1-5Complex Numbers
Real Numbers
Real numbers are number which can be found on a continuous number line
Complex Numbers
Also known as imaginary numbers
Ex. i = √ -1 and √-a = i √a
Practice with complex numbers
1. √7 ∙ √2 2. √ -7 √14 i√7
3. √-4 + √-16 + √-1 4.= √-25 i√4 + i√16 + i√1 √-50
2i + 4i + I = i√257i i√50
i√(1/2) = i√2
2
Solving Quadratic Equations
Quadratic Equation- It’s any equation that can be written in the form where a ≠ 0.
A root of a quadratic equation is a value of the variable that satisfies the equation.
You can solve these in 3 ways-
1.Factoring- whenever the product of two factors is zero, at least one of the factors must be zero.
2. Completing the square- The method of transforming a quadratic equation so that one side is a perfect square trinomial
3. Quadratic formula- derived by completing the square.
ExamplesSolve y²-8y=2
y²-8y-2=0
Use quadratic equation
-b+- √b²-4ac
2c
8+- √64-4(1)(-2)
2
8+- √72
2
8+-6 √2
2
4+-3 √2
Solve (4x-1) ²=-4
16x²-8x+5=0 Use quadratic equation
-b+- √b²-4ac 2c
8+- √64-4(16)(5)
328+- √-
256 328+-16i 32
1+-4i 8
Quadratic Functions and their Graphs
Quadratic function- is the set of points (x, y) that satisfy the equation.
axis of symmetry- when you fold the graph along this axis, the two halves of the graph coincide.
The vertex of the parabola is the point where the axis of symmetry intersects the parabola.
Find the intercepts, axis of symmetry, and vertex of the parabola y = (x + 4)(2x – 3).
Axis of Symmetry: Equation=-b
2a = -5 4Vertex x: -5
4
To get y plug -5/4 in for x
y=2(-5/4) ²+5(-5/4)-12
=-9/8
X intercept: plug 0 in for x
y=2(0)²+5(0)-12
=12
Y intercept: plug 0 in for y
0=2x²+5x-12
=-4 3/2
Curve fitting-it is the process in which you find many kinds of curves to pass through data points.
One possible curve is the parabola with equation C(x)=ax2+bx+c
To find the values of a, b, and c, substitute the data from the graph into this equation.
Using the given model, determine the number of calories burned per gram hour by a parakeet flying level at 26mi/h. Compare your answer with the actual laboratory result of 123.5 calories per gram hour.
1st substitute the speed of 26 mi/h. into the quadratic equation.c(x)=0.678x ²-27.752x+387.360c(26)=.678(26) ²-27.752(26)+387.360c(x)=124.136
The energy expenditure of the parakeet flying at 26mi/h is about 124 calories per gram hour. Since this result is approximately within one unit of the actual energy expenditure of 123.5 calories per gram hour, we can assume that our model is probably a good one.