5.1 Solving Systems of Linear Equations by Graphing
System of Linear Equations two linear eqns. considered at the same time Ex. x + y = 5 x – y = 1 solutions to systems of eqns. are all ordered pairs that are solns. to BOTH eqns. (both eqns. give a true stmt. when ordered pair is sub. in)
Ex. For the system: x + y = 5 x – y = 1 is (3, 2) a soln? x + y = 5 3 + 2 = 5 5 = 5 true x – y = 1 3 – 2 = 1 1 = 1 Since (3, 2) satisfies BOTH eqns, YES, it is a soln to the system (b) is (-1, 6) a soln? x + y = 5 -1 + 6 = 5 5 = 5 true x – y = 1 -1 – 6 = 1 -7 = 1 false Since (-1, 6) DOES NOT satisfy BOTH eqns, NO, it is NOT a soln to the system
Solving by Graphing Graph first eqn. Graph second eqn. on same set of axes Look for a point of intersection The point of intersection is the soln. If there is no point of intersection no solution If lines intersect everywhereinfinitely many solns. Check the soln. in BOTH eqns., if necessary
Ex. Solve the system by graphing: y = -2x + 1 x = -1 Graph y = -2x + 1 y-int: 1, m = -2/1 rise = -2, run = 1 Graph x = -1 (vert. line crossing x-axis at -1) Point of intersection is soln. (-1, 3) Check (-1, 3) in both eqns. y = -2x + 1 x = -1 3 = -2(-1) + 1 -1 = -1 3 = 2 + 1 true 3 = 3 true y 3 2 1 x -3 -2 -1 1 2 3 -1 -2 -3
Worksheet Notes: Inconsistent system: a system with no soln. (#2 on worksheet) Dependent eqns: eqns. that produce the same line (#3 on worksheet)
Summary One point of intersection solution: {(x, y)} Lines (distinct lines) slope different No point of intersection inconsistent system No solution empty set Ø Lines (parallel) slope same y-int different Lines intersect everywhere dependent eqns. Infinite number of solutions solution: {(x, y)|eqn.} Lines (coincide - same line) slope same y-int same