What will be the value of a, for which the equation 5x^2 + ax + 5 and x^2 – 12x + a will have real roots?(a) a = 37(b) 10 < a < 36(c) 36 < a < 10(d) a = 9The question was posed to me during an online interview.My doubt stems from Quadratic Equation in division Quadratic Equation of Mathematics – Class 10

What will be the value of a, for which the equation 5x^2 + ax + 5 and

1.	What will be the value of a, for which the equation 5x^2 + ax + 5 and x^2 – 12x + a will have real roots?(a) a = 37(b) 10 < a < 36(c) 36 < a < 10(d) a = 9The question was posed to me during an online interview.My doubt stems from Quadratic Equation in division Quadratic Equation of Mathematics – Class 10
Answer» Right OPTION is (b) 10 < a < 36 The explanation is: The roots of both the EQUATIONS are real. Discriminant of 5x^2 + ax + 5 : b^2 – 4ac = a^2 – 4 × 5 × 5 = a^2 – 100 Since, roots are real; discriminant will be greater than 0. a^2 ≥ 100 a ≥ ±10 Now, discriminant of x^2 – 12x + a : b^2 – 4ac = -12^2 – 4 × 1 × a = 144 – 4a Since, roots are real; discriminant will be greater than 0. 144 ≥ 4a a ≤ \(\frac {144}{4}\) = 36 For both the equations to have real roots the value of a must lie between 36 and 10.

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