Smilebuffalo
Member
two roots of x^3 + mx^2 + 15x - 7 = 0 are equal and rational. Find m.
?
answer: m = -9
?answer: m = -9
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roots of polynomials (1 Viewer)
- Thread starter Smilebuffalo
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tommykins
i am number -e^i*pi
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@, $ be roots.
@^2.$ = 7 -> $ = 7/@^2
@ + @ + $ = -m
@^2 + @$ + @$ = 15 -> @^2 + 2@$ = 15 -> @^2 + 2@.7/@^2 = 15
@^2 + 14/@ = 15
@^3 + 14 = 15@
@^3 - 15@ + 14 = 0
Solving that, you get @ as 1 (since @ is rational)
hence 1.$ = 7, $ = 7
@ + @ + $ = -m
1+1+7 = -m
m = -9
probably a better way but yeah.
@^2.$ = 7 -> $ = 7/@^2
@ + @ + $ = -m
@^2 + @$ + @$ = 15 -> @^2 + 2@$ = 15 -> @^2 + 2@.7/@^2 = 15
@^2 + 14/@ = 15
@^3 + 14 = 15@
@^3 - 15@ + 14 = 0
Solving that, you get @ as 1 (since @ is rational)
hence 1.$ = 7, $ = 7
@ + @ + $ = -m
1+1+7 = -m
m = -9
probably a better way but yeah.
Smilebuffalo
Member
ahh i see. So its necessary to solve a cubic equation in order to solve this problem?
how did you solve the cubic: @^3 - 15@ + 14 = 0 ???
how did you solve the cubic: @^3 - 15@ + 14 = 0 ???
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