Math, asked by mohith20, 1 month ago

If the roots of (b – c)x2 + (c – a)x + (a - b) = 0 are equal, show that a,b,c are in A.P.

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Answers

Answered by ayatiadubey
0

Answer:

A. P.

Step-by-step explanation:

(b-c)x²+(c-a)x+(a-b)=0

Comparing with quadratic equation

Ax²+Bx+C=0

A=(b-c),B=c-a,C=a-b

Discriminant is eqwual to zero when roots are equal

D=B²-4AC=0

D=(c-a)²−4(b-c)(a-b)=0

D=(c²+a²−2ac)-4(ba-ac-b²+bc)=0

D=c²+a²−2ac-4ab+4ac+4b²-4bc=0

c²+a²+2ac-4b(a+c)+4b²=0

(a+c)²-4b(a+c)+4b²=0

[(a+c)-2b]²=0

a+c=2b,

Thus, a , b, c are in A.P.

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