If the zeros of the polynomial f(x)=x³-12x²+39x+a are in Arithematic Progression ,find the value of 'a'.
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Answered by
6
Hey There!
The answer is in the image.
Some explanation:
For a cubic equation:
ax³+bx²+cx+d=0
Sum of roots = -b/a
Product of roots taken two at a time = c/a
Product of roots = -d/a
This concept has been used to find the answer
Hope it helps,
Purva
Brainly Community
The answer is in the image.
Some explanation:
For a cubic equation:
ax³+bx²+cx+d=0
Sum of roots = -b/a
Product of roots taken two at a time = c/a
Product of roots = -d/a
This concept has been used to find the answer
Hope it helps,
Purva
Brainly Community
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Answered by
5
Hi ...here is your solution....
Let (a- d ), a and (a+ d) are the roots of given polynomial.
so
x³ -12x² + 39x + K ,
sum of roots = - ( coefficient of x²)/(coefficient of x³)
(a - d)+ a + (a + d) = -(-12)/1 = 12
3a = 12
a = 4
now
sum of products of two consequitive roots = ( coefficient of x)/(coefficient of x³)
(a - d)a + a(a + d) + (a + d)(a - d) = 39
a² -ad + a² + ad + a² -d² = 39
3a² - d² = 39
3(4)² - d² = 39
3 × 16 - d² = 39
d² = 9
d = ±3
hence,
roots are 1 , 4 , 7 or 7, 4 , 1
now,
products of all roots = - ( constant)/coefficient of x³
7 × 4 × 1 = - ( K)/1
K = -28
hope this helps you...
Let (a- d ), a and (a+ d) are the roots of given polynomial.
so
x³ -12x² + 39x + K ,
sum of roots = - ( coefficient of x²)/(coefficient of x³)
(a - d)+ a + (a + d) = -(-12)/1 = 12
3a = 12
a = 4
now
sum of products of two consequitive roots = ( coefficient of x)/(coefficient of x³)
(a - d)a + a(a + d) + (a + d)(a - d) = 39
a² -ad + a² + ad + a² -d² = 39
3a² - d² = 39
3(4)² - d² = 39
3 × 16 - d² = 39
d² = 9
d = ±3
hence,
roots are 1 , 4 , 7 or 7, 4 , 1
now,
products of all roots = - ( constant)/coefficient of x³
7 × 4 × 1 = - ( K)/1
K = -28
hope this helps you...
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