SATHEE: Sequences And Series Ques 65

Sequences And Series Ques 65

If $a, b, c$ are in GP, then the equations $a x^{2}+2 b x+c=0$ and $d x^{2}+2 e x+f=0$ have a common root, if $\frac{d}{a}, \frac{e}{b}, \frac{f}{c}$ are in

(1985, 2M)

(a) $AP$

(b) $GP$

(d) None of these

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Answer:

Correct Answer: 65.(a)

Solution:

Formula:

HARMONICAL PROGRESSION (H.P.):

Since, $a, b, c$ are in GP.

$\Rightarrow \quad b^{2}=a c$

Given, $\quad a x^{2}+2 b x+c=0$

$\Rightarrow \quad a x^{2}+2 \sqrt{a c} x+c=0$

$\Rightarrow \quad(\sqrt{a} x+\sqrt{c})^{2}=0 \Rightarrow x=-\sqrt{\frac{c}{a}}$

Since, $a x^{2}+2 b x+c=0$ and $d x^{2}+2 e x+f=0$ have common root.

$\therefore \quad x=-\sqrt{c / a}$ must satisfy.

$ d x^{2}+2 e x+f =0 $

$ \Rightarrow d \cdot \frac{c}{a}-2 e \sqrt{\frac{c}{a}} +f=0 \Rightarrow \frac{d}{a}-\frac{2 e}{\sqrt{a c}}+\frac{f}{c}=0 $

$ \Rightarrow \frac{2 e}{b} =\frac{d}{a}+\frac{f}{c} \quad\left[\because b^{2}=a c\right]$

Hence, $\quad \frac{d}{a}, \frac{e}{b}, \frac{f}{c}$ are in an AP.

Sequences And Series

Sequences And Series Ques 65

Answer:

Formula:

Table of Contents

Engineering Preparation

Medical Preparation

NCERT Books & Solutions

Important Resources

Other Resources

Syllabus

Mentorship

NCERT Video Solution

Sequences And Series

Sequences And Series Ques 65

Answer:

Formula:

Table of Contents

Engineering Preparation

Medical Preparation

NCERT Books & Solutions

Important Resources

Other Resources

Syllabus

Mentorship

NCERT Video Solution

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