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Prove that the roots of x^2 +(1-k)x+k-3=0 are real for all real values of k ​

User Ij
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Answer:

the discriminant is positive, so there are 2 distinct real roots

Explanation:

The discriminant of quadratic ax²+bx+c=0 is given by ...

d = b² -4ac

The value of the discriminant for the given equation is ...

d = (1 -k)² -4(1)(k-3) = 1 -2k +k² -4k +12

d = k² -6k +13 = (k -3)² +4

The squared term in the sum cannot be negative, so the value of the discriminant is at least +4. For any positive value of the discriminant, the quadratic will have two real roots.

User TonyNeallon
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