Find all. The zeroes of the polynomial (2x⁴-9x³+5x²+3x-1)..if two of its zeroes are (2+root 3) and (2-root 3)
Answers
Step-by-step explanation:
if two zeros ( 2 +√3) and ( 2 -√3) are given of polynomial it means
{ x -(2 -√3)} and { x -( 2+√3) } are the factors of given polynomial ,
hence,
{ x -(2 -√3)}{x -(2+√3)} is a factor of given polynomial .
{ x² -(2+√3)x -(2-√3)x +(2-√3)(2+√3)} is a factor of given polynomial .
{ x²-(4)x + 1} is a factor of given polynomial .
hence, x²-4x +1 is divisible by given polynomial .
now,
x² -4x +1 ) 2x⁴ -9x³+ 5x² +3x -1( 2x²-x -1
2x⁴ -8x³ +2x²
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-x³ +3x² +3x
-x³ +4x² -x
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-x² + 4x -1
-x² +4x -1
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0000
so, 2x² -x -1 is a factor in which two unknown roots present
now,
2x² -x -1 =0
2x² -2x +x -1 =0
2x( x -1)+ ( x -1) = 0
(2x +1)( x -1)=0
x = -1/2 and 1
so, -1/2 and 1 are two unknown roots of given polynomial
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Answer:
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