* Your assessment is very important for improving the workof artificial intelligence, which forms the content of this project
Download 7.2 Solving Linear Systems by Substitution
Survey
Document related concepts
Maxwell's equations wikipedia , lookup
Two-body problem in general relativity wikipedia , lookup
Unification (computer science) wikipedia , lookup
Equation of state wikipedia , lookup
Derivation of the Navier–Stokes equations wikipedia , lookup
Perturbation theory wikipedia , lookup
BKL singularity wikipedia , lookup
Navier–Stokes equations wikipedia , lookup
Equations of motion wikipedia , lookup
Itô diffusion wikipedia , lookup
Calculus of variations wikipedia , lookup
Differential equation wikipedia , lookup
Schwarzschild geodesics wikipedia , lookup
Transcript
Algebra 7.2 Solving Systems Using Substitution Solution to a System of Linear Equations You have already learned that the solution is the point of intersection of the two graphed lines. To solve: 1. Graph both equations 2. Identify intersection point (x,y) 3. Plug in to original equations to check There are two algebraic methods that allow you to solve a system easily without graphing. Today you will learn the method called SUBSTITUTION. Steps 1. In one equation, isolate one variable. 2. Substitute expression from Step 1 into second equation and solve for the other variable. 3. Plug in value from Step 2 into revised equation from Step 1 and solve. 4. Check solution in both original equations. Solve the linear system. 3x + y = 5 2x – y = 10 y = 5 – 3x 2x – ( 5 – 3x ) = 10 Hint: It is usually easiest to isolate positive 1x or 1y. y = 5 – 3(3) 2x – 5 + 3x = 10 y=5-9 5x – 5 = 10 y=-4 5x = 15 The solution is (3, - 4) x=3 Check: 3(3) + (-4) = 5 2(3) – (-4) = 10 Solve the linear system. 2x + 6y = 15 x = 2y 2( 2y ) + 6y = 15 4y + 6y = 15 10y = 15 y = 15/10 y = 3/2 x = 2( 3/2) x=3 The solution is (3, 3/2) Check: 2(3) + 6(3/2) = 15 3 = 2(3/2) You try! x + 2y = 4 -x + y = -7 y=x–7 x + 2( x - 7 ) = 4 x + 2x - 14 = 4 3x – 14 = 4 3x = 18 x=6 y=6–7 y = -1 The solution is (6, - 1) Check: 6 + 2(-1) = 4 -6 + (-1) = -7 Mixture Problems Systems are often used to solved mixture problems. These are problems when you mix two quantities. You know the total quantity and the total value, but not how much of each type. To solve: •Write one equation to describe QUANTITY. •Write other equation to describe VALUE. Set up a system and solve the mixture problem. An audio store sells two styles of I-pod Nanos. The 2 GB model costs $150 and the 4GB model costs $225. Last Saturday the store sold 22 Nanos for a total of $3900. How many of each model did they sell? Let x be the # of 2 GB models sold Let y be the # of 4 GB models sold Quantity: Value: x + y = 22 150x + 225y = 3900 Now, you solve. There were 14 2GB Nanos and 8 4 GB Nanos sold. Homework pg. 408 #17 – 35 odd, 42