How do I solve these?

2 ANSWERS

1. 
   

   The first question is easy basically divide by the "x" number.
   
   The quadratic formula is
   
   x=(b+/- the square root of b^2-4ac)/2a
   
   To graph you need a graphing medium but to help you need a "x" and a "y".
   
   A square root is a "perfect multiple" like 2 is the square root of 4, but 5 is NOT a square root of 26.
   
   Hopes this helps.

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2. 
   

   1
   
   -------------------------
   
   4x^2 - 4x - 4 = 0
   
   4x^2 -4x -4 +1 -1 = 0
   
   (4x^2 -4x + 1) -4 -1 = 0
   
   (2x-1)^2 -5 = 0
   
   (2x-1)^2 = 5
   
   2x-1 = +/- sqrt(5)
   
   2x = 1 +/- sqrt(5)
   
   x = (1 +/- sqrt(5))/2
   
   So:
   
   x = (1+sqrt(5))/2 =  1.61803398874989484820
   
   x = (1-sqrt(5))/2 = -0.61803398874989484820
   
   #2
   
   -------------------------
   
   x^6 - 64 = 0
   
   x^6 = 64
   
   x = +/- (64))^(1/6)  = +/- 2
   
   So x = 2 or x = -2
   
   #3
   
   -------------------------
   
   9x^4 - 24x^3 + 16x^2 = 0
   
   x^2 ( 9x^2 - 24x + 16) = 0
   
   x^2 ( 3x - 4)(3x - 4) = 0
   
   So:
   
   x^2 = 0
   
   x=0
   
   or
   
   3x - 4 = 0
   
   3x = 4
   
   x = 4/3
   
   Therefore, x=0 or x = 4/3
   
   #4
   
   -------------------------
   
   0.01x^2 - 0.05x - 0.04 = 0
   
   x^2 - 5x - 4 = 0
   
   x = (-(-5) +/- sqrt((-5)^2 - 4*1*(-4))) / (2*1)
   
   x = (5 +/- sqrt(25 + 16)) / 2
   
   x = (5 +/- sqrt(41)) / 2
   
   So:
   
   x = (5 + sqrt(41))/2 = 5.70156211871642434324
   
   or
   
   x = (5 - sqrt(41))/2 = -0.70156211871642434324
   
   #5
   
   -------------------------
   
   slope 1 = rise/run = (-1-5)/(-2-1) = -6/-3 = 2
   
   slope 2 = rise/run = (3-(-15))/(1-5) = 18/-4 = -9/2
   
   These lines are neither parallel nor perpendicular.
   
   If they were parallel, then their slopes would be equal.
   
   If they were perpendicular, then they would have to
   
   be negative reciprocals of each other.  Algebraically:
   
   slope1 = -1/slope2
   
   

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