हिंदी

Find that value of p for which the quadratic equation (p + 1)x^2 – 6(p + 1)x + 3(p + 9) = 0, p ≠ –1 has equal roots. Hence, find the roots of the equation.

Advertisements
Advertisements

प्रश्न

Find that value of p for which the quadratic equation (p + 1)x2 – 6(p + 1)x + 3(p + 9) = 0, p ≠ –1 has equal roots. Hence, find the roots of the equation.

योग
Advertisements

उत्तर

It is given that the quadratic equation (p + 1)x2 – 6(p + 1)x + 3(p + 9) = 0, p ≠ –1 has equal roots.

Therefore, the discriminant of the quadratic equation is 0.

Here, 

a = (p + 1)

b = –6(p + 1)

c = 3(p + 9)

D = b2  4ac = 0

[–6(p + 1)]2 4 × (p + 1) × 3(p + 9) = 0

36(p + 1)2  12(p + 1)(p + 9) = 0

12(p + 1)[3(p + 1) – (p + 9)] = 0

12(p + 1)(2p – 6) = 0

p + 1 = 0 or 2p – 6 = 0

p + 1 = 0

p = 1

This is not possible as p 1

2p  6 = 0

p = 3

So, the value of p is 3.

Putting p = 3 in the given quadratic equation, we get

(3 + 1)x2  6(3 + 1)x + 3(3 + 9) = 0

4x2  24x + 36 = 0

4(x2  6x + 9) = 0

(x  3)2 = 0

⇒ x – 3 = 0

x = 3

Thus, the root of the given quadratic equation is 3.

shaalaa.com
  क्या इस प्रश्न या उत्तर में कोई त्रुटि है?
अध्याय 4: Quadratic Equations - EXERCISE 4C [पृष्ठ २०२]

APPEARS IN

आर.एस. अग्रवाल Mathematics [English] Class 10
अध्याय 4 Quadratic Equations
EXERCISE 4C | Q 10. | पृष्ठ २०२
Share
Notifications

Englishहिंदीमराठी


      Forgot password?
Use app×