PreCalculus Unit 7 Review

7.1

7.2

7.3

7.5

Bonus

100

Solve by Substitution. 3x+2y=16 x=2y

(4, 2)

100

[-2 2 1] + [1 3 -1]

[-1 5 0]

100

Solve (Use Triangular Form)

x -2y + z =2

-2x +2y -2z=3

-x +2y +z=-2

(-5, -3.5, 0)

100

What are the boundaries of

y>2x+3 and y < 3x

y=2x + 3

y=3x

200

Solve by Elimination

x-3y=6

-3x+y=6

( -3,-3)

200

Find the additive inverse of the Matrix

[2 -1 2 ]

[4 3 0 ]

[-2 1 -2]

[-4 -3 0]

200

Solve by row-echelon and reduced-row echelon

x+2y−z=4

2x+y+z=−2

x+2y+z=2

(-10/6 , 7/3, -1)

200

Solve by Graphing

Y=< 2x +1

y> x²

Graph

300

Solve by graphing

x² +3x=y

y=x²

(0,0)

300

-4 [ 4 0]

[1 -1]

[-16 0]

[-4 4]

300

Solve using inverse Matrices

x-3y+3z=-4

2x+37-z=15

4x-3y-z=19

(5, 1, -2)

300

Solve the system of inequality

y= 2x+5

y=2x

No solution

400

Determine whether the ordered triple (3,-2,1) is a solution to the system.

x+y+z=2

6x-4y+5z=31

5x+2y+2z=13

Yes, the triple (3,-2,1) is a solution.

400

[1 2 3] times [1 2]

[4 1 0] [0 -1]

[2 0 1]. [1 4]

Solution

[4 12]

[4 7]

[3 8]

400

Find Reduced Row Echelon. Solve.

5r +2s=0

-3t=12

6s+5t=10

(-2,5,-4)

400

Solve the System

x²+ y²<9

y=3

No solution

400

Find x-y

2x-4y=5

x+2y=2

x-y=2.25-(-.124)=2.375

500

Solve by Elimination

2x+3y=2

4x+6y=4

Infinitely many solutions

500

Find the multiplicative inverse of the following matrix

[4 3]

[2 2]

[ 1 -3/2 ]

[-1 2]

500

Solve

2x -y + z =10

4x +2y -3z =10

x. -3y +2z=8

(4, 0, 2)

500

Solve by graphing or algebraically

y²<=-x²+25

y=5

(0,5)