Solving Linear Systems by Elimination Assignment
Solution to the system is ( , )
(4, -5)
3x + 6y = -18 2y= 3x - 22 Complete the second equation below so that the terms in the system align. 3x+ 6y= -18
-3, 2, -22
Which of the following shows the system with like terms aligned?
-4x + 0.4y = -0.8 6x + 0.4y = 4.2
It takes a printer 2 1/2 min to print 24 black-and-white pages and 4 color pages. It takes the same printer 3 1/4 min to print 30 black-and-white pages and 6 color pages. Let b represent the time in minutes needed to print a black-and-white page and c represent the time in minutes needed to print a color page. The shown system represents the given problem. 24b + 4c = 2 1/2 30b + 6c = 3 1/4 Solve the system to complete the statement. It takes the printer ________ min to print a black-and-white page and ________ min to print a color page.
1/12 1/8
Which equation results when you add the equations?
B) 8y =-40
-2x + 5y =-15 5x + 2y = -6 How could you solve this system using elimination? Check all that apply.
B) Multiply the first equation by 5 and the second equation by 2, then add . C) Multiply the first equation by 2 and the second equation by 5, then subtract.
1/2x + 3/2y = -7 -3x + 2y = -2 You could produce a pair of like terms with opposite coefficients by multiplying the first equation by what number?
C) 6
The solution to the system is ( , )
( 0.5 , 3 )
The solution to the system is ( , )
( -2 , -4 )
The solution to the system is ( , )
( 0, -3)
How can subtracting the equations help you solve the system?
It eliminates the y-terms.
6x - 2y = 28x + 3y = 14Explain how knowing how to find the least common multiple (LCM) of two numbers can help you solve the system of equations presented here by eliminating the x-terms.
The LCM of 6 and 8 is 24. Knowing this, multiply the first equation by 4 and the second by −3 to get opposite coefficients. Then, add the equations to eliminate x.
If you multiply the first equation by 6, the following system is the result.3x + 9y = -42-3x + 2y = -2To solve this system by elimination, __________ the equations.
add
How many solutions does the system have?
exactly one
