Algebra 7.3 Solving Linear Systems by Linear Combinations

This is the third and final way to solve linear systems. The other two are ____________ and ______________. graphing substitution

Steps 1)Arrange the equations with like terms in columns. 2)Multiply one or both equations by a number to obtain coefficients that are opposites for one variable. 3)Add the equations. One variable will be eliminated. Solve for the other. 4)Substitute this number into either original equation and solve for the other variable. 5)Check.

Solve -2x + 2y = -8 2x + 6y = -16 8y = -24 y = -3 2x + 6y = -16 2x + 6(-3) = -16 2x – 18 = -16 2x = 2 x = 1 Solution: (1, -3) Check: -2(1) + 2(-3) = -8 2(1) + 6(-3) = -16

Solve 3x = -6y x + 3y = 6 Rewrite the top: 3x + 6y = 12 -x + 3y = 6 -3x + 9y = 18 15y = 30 y = 2 -x + 3y = 6 -x + 3(2) = 6 -x + 6 = 6 -x = 0 x = 0 Solution: (0, 2) [ ]3 Check: 3(0) = -6(2) (0) + 3(2) = 6

Solve 3x + 5y = 6 -4x + 2y = 5 -12x + 6y = 15 26y = 39 y = 39/26 y = 3/2 -4x + 2(3/2) = 5 -4x + 3 = 5 -4x = 2 x = -½ Answer: (-½, 3/2) [ ]3 [ ]4 12x + 20y = 24 Check: 12(-½) + 20(3/2) = 24 -4(-½) + 2(3/2) = 5

You try! Solve. 2x + 8y = -2 5x + 4y = 3 -10x - 8y = -6 -8x = -8 x = 1 2(1) + 8y = y = -2 8y = -4 y = -½ Answer: (1, -½) [ ]-2 Check: 2(1) + 8(-½) = -2 5(1) + 4(-½) = 3

A boat traveled from 24 miles downstream in 4 hours. It took the boat 12 hours to return upstream. Find the speed of the boat in still water(B) and the speed of the current(C). Speed in still water + current speed = speed downstream Speed in still water – current speed = speed upstream B + C = 6 mph B – C = 2 mph 2B = 8 mph B = 4 mph 4 mph + C = 6 mph C = 2 mph The boat goes 4 mph. The current goes 2 mph. Speed downstream is 24 miles/4 hours = 6 mph Speed upstream is 24 miles/12 hours = 2 mph

HW P (#9-41 4X) (#45-48)