Math, asked by karangutkarsunil4, 5 months ago

if one of the root of the quadratic equation is 8x²+6x+P=0 is ½ find P​

Answers

Answered by Anonymous
4

Answer:

⇒ The given quadratic equation is 8x

2

−6x+k=0, comparing it with ax

2

+bx+c.

⇒ Then, a=8,b=−6,c=k

⇒ It is given that one root of this equation is square of the other root. So, if we assume one root to be p, the other root can be p

2

. So, we assume the roots to be p and p

2

.

⇒ Sum of the roots =

a

−b

∴ p+p

2

=

8

−(−6)

∴ p+p

2

=

4

3

∴ 4p+4p

2

=3

∴ 4p

2

+4p−3=0 ----------- ( 1 )

⇒ Product of the roots =

a

c

∴ p×p

2

=

8

k

∴ p

3

=

8

k

------- ( 2 )

⇒ 4p

2

+4p−3=0 [ From ( 1 ) ]

⇒ 4p

2

−2p+6p−3=0

⇒ 2p(2p−1)+3(2p−1)=0

⇒ (2p+3)(2p−1)=0

∴ p=

2

−3

and p=

2

1

Now, putting p=

2

1

in equation ( 2 ) we get,

⇒ (

2

1

)

3

=

8

k

8

1

=

8

k

∴ k=1

Now, using p=

2

−3

in equation ( 2 )

⇒ (

2

−3

)

3

=

8

k

8

−27

=

8

k

∴ k=−27

∴ Values of k are 1 and −27

Answered by samruddhipandit
8

❤Hope it helps u Mark as brainliest if it helps to u ❤

Step-by-step explanation:

Using k = -3/2,

k^3 = p/8

=> (-3/2)^3 = p/8

=> -27/8 = p/8

=> p = -27

Using k = 1/2

k^3 = p/8

=> (1/2)^3 = p/8

=> 1/8 = p/8

=> p = 1

❤❤❤Happy dassera ❤❤❤

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