BY: JAKE COVEY NATHAN HENKE ZACH BASSUENER Math Project
Math it’s a beautiful Thing!!!
Instructions Work shown Find LCD in the equation. LCD is x Take the LCD out of the equation by multiplying the whole equation by it. Move all variables on to one side of the equation Reverse foil the equation to find the zeros. x + 3/x = 4 X(x+3/x = 4) X 2 +3= 4x X 2 -4x +3= 0 (x-1) or (x-3) Example 1- solve by clearing fractions
Instructions Work shown Multiply the equation by x-4 (LCD) Distributive property Quadratic formula Simplify the equation Simplify even further Example 2- Solve a Rational Equation
Instructions Work Shown Example 3- Eliminating Extraneous Solutions To the right is the original equation Next you are going to multiply the equation by the LCD to get rid of the fractions Then you are going to use the distributive property Finally you are going to factor your equation. or x=3
Work shown Now replace x by your answers in the equations and see if they work. When plugging the -1/2 into the equation and simplifying you find out that -1/2 works. Making it a valid solution, but when you test 3 you find out that it doesn’t work making it an extraneous solution Example 3- Eliminating Extraneous Solutions Cont.
The LCD of the equation on the right is x(x+2) First you are going to multiply the equation by the LCD to cancel the fraction This will expand the equation Next simply and Factor You are going to come up with the answers x=0 and x=-2 once you substitute these answers into the original equation you find out that it results in a division by 0 making both answers extraneous solutions. This equation has no solution Example 4 – Eliminating Extraneous Solutions
How much pure acid must be added to 50 mL of a 35% acid solution to produce a mixture that is 75% acid? Example 5- Calculating Acid Mixture 100%35%75% x50 50+x += 1x +.35(50) =.75(50+x) This is the set up for the equation. View next slide.
Work Shown 1x +.35(50) =.75(50+x) 1x = x x = x -.75x -.75x.25x = 20 x= 80mL Example 5- Calculating Acid Mixtures