3.2 – Solving Systems of Eqs. Algebraically

3.2 – Solving Systems of Eqs. Algebraically

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection.

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest)

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable!

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18 -2y = 14

3.2 – Solving Systems of Eqs. Algebraically • Recall that when solving graphically, solution is point of intersection. Substitution Method Ex. 1 Use substitution to solve the system of equations. x + 2y = 8 ½x – y = 18 • Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18 -2y = 14 y = -7

Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18 -2y = 14 y = -7 • Substitute into equation from 1) and solve for x.

Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18 -2y = 14 y = -7 • Substitute into equation from 1) and solve for x. x = -2y + 8

Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18 -2y = 14 y = -7 • Substitute into equation from 1) and solve for x. x = -2y + 8 x = -2(-7) + 8

Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18 -2y = 14 y = -7 • Substitute into equation from 1) and solve for x. x = -2y + 8 x = -2(-7) + 8 x = 14 + 8

Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18 -2y = 14 y = -7 • Substitute into equation from 1) and solve for x. x = -2y + 8 x = -2(-7) + 8 x = 14 + 8 x = 22

Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18 -2y = 14 y = -7 • Substitute into equation from 1) and solve for x. x = -2y + 8 x = -2(-7) + 8 x = 14 + 8 x = 22 (22

Solve 1st eq. for variable (whichever is easiest) x + 2y = 8 - 2y - 2y x = -2y + 8 • Substitute in and solve for other variable! ½x – y = 18 ½(-2y + 8) – y = 18 -y + 4 – y = 18 -2y + 4 = 18 -2y = 14 y = -7 • Substitute into equation from 1) and solve for x. x = -2y + 8 x = -2(-7) + 8 x = 14 + 8 x = 22 (22,-7)

Elimination Method

Elimination Method Ex. 2 Use the elimination method to solve the system of equations.

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 (-1)[2a + 2b = 7]

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 -2a - 2b = -7

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a+ 2b = 15 -2a- 2b = -7

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a+ 2b = 15 -2a- 2b = -7 2a + 0 = 8

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 -2a - 2b = -7 2a = 8

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 -2a - 2b = -7 2a = 8 a = 4

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 -2a - 2b = -7 2a = 8 a = 4 • Plug 4 into first eq. and solve for b.

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 -2a - 2b = -7 2a = 8 a = 4 • Plug 4 into first eq. and solve for b. 4(4) + 2b = 15

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 -2a - 2b = -7 2a = 8 a = 4 • Plug 4 into first eq. and solve for b. 4(4) + 2b = 15 16 + 2b = 15

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 -2a - 2b = -7 2a = 8 a = 4 • Plug 4 into first eq. and solve for b. 4(4) + 2b = 15 16 + 2b = 15 2b = -1

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 -2a - 2b = -7 2a = 8 a = 4 • Plug 4 into first eq. and solve for b. 4(4) + 2b = 15 16 + 2b = 15 2b = -1 b = -½

Elimination Method Ex. 2 Use the elimination method to solve the system of equations. a. 4a + 2b = 15 2a + 2b = 7 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 4a + 2b = 15 -2a - 2b = -7 2a = 8 a = 4 • Plug 4 into first eq. and solve for b. 4(4) + 2b = 15 16 + 2b = 15 2b = -1 b = -½, So the lines intersect at (4, -½)

b. 3x – 7y = -14 5x + 2y = 45

b. 3x – 7y = -14 5x + 2y = 45 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together

b. 3x – 7y = -14 5x + 2y = 45 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 3x – 7y = -14 5x + 2y = 45

b. 3x – 7y = -14 5x + 2y = 45 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together (2)[3x – 7y = -14] (7)[5x + 2y = 45]

b. 3x – 7y = -14 5x + 2y = 45 • Make numbers of 1 of the variables the same number with opposite signs, then add the equations together 6x – 14y = -28 35x + 14y = 315

3.2 – Solving Systems of Eqs. Algebraically