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W0lf93
The answer is x = 6 + √21. The general form of quadratic function is ax2 + bx + c = 0. So, the equation x2 = 12x – 15 in the general form will be look like: x2 - 12x + 15 = 0. Now, move the number term on the right side of the equation: x2 - 12x = -15. Since b = 12, (b/2)2 = (12/2)2 = (6)2 = 36. Add this number on the both side of equation: x2 - 12x + 36 = -15 + 36. From here: (x-6)2 = 21. Take square root on both sides: x - 6 = √21. Solve for x: x = 6 + √21
carlosego
For this case we have the following polynomial:
 [tex] x ^ 2 = 12x - 15 [/tex]
 The first thing to do is to place the variables on the same side of the equation.
 We have then:
 [tex] x ^ 2 - 12x = -15 [/tex]
 We complete the square by adding the term (b / 2) ^ 2 on both sides of the equation.
 We have then:
 [tex]x ^ 2 - 12x + (-12/2) ^ 2 = -15 + (-12/2) ^ 2 [/tex]
 Rewriting we have:
 [tex]x ^ 2 - 12x + (-6) ^ 2 = -15 + (-6) ^ 2 x ^ 2 - 12x + 36 = -15 + 36 (x-6) ^ 2 = 21[/tex]
 [tex]x-6 =+/- \sqrt{21} [/tex]
 Therefore, the solutions are:
 [tex]x = 6 - \sqrt{21}[/tex]
 [tex]x = 6 + \sqrt{21}[/tex]
 Answer:
 the solution set of the equation is:
 [tex]x = 6 - \sqrt{21}[/tex]
 [tex]x = 6 + \sqrt{21}[/tex]

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