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Relationship of Zeroes With Coefficients of Quadratic Polynomial

Polynomial - Concepts

Polynomial Expression

Degree of a Term

Degree of a Polynomial

Standard Form For a Polynomial

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Factor And Remainder Theorem

Relationship of Zeroes With Coefficients of Quadratic Polynomial

Graphical Representation of A Polynomial

Forming a Quadratic Polynomial When Zeroes are Given

Division of Polynomial by another Polynomial Long Division

Factorization of Cubic Polynomial

Relationship of Zeros With Coefficients of Cubic Polynomial

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Concept Explanation

Relationship of Zeroes With Coefficients of Quadratic Polynomial

Relationship of Zeroes With Coefficients Of Quadratic Polynomial:

If $p(x)ax+b,aneq 0,;and;alpha$ (read as alpha) is a zero of p(x) then

$alpha =-frac{b}{a}=frac{constant;term}{coefficient;of;x}$

If $p(x)=ax^{2}+bx+c, a neq 0$ and $alpha ,beta$ ( read as beta) are two zeroes of p(x) then

$alpha + beta =frac{-b}{a}=-frac{coefficient;of;x}{coefficient;of;x^{2}}$

$alphabeta =frac{c}{a}=frac{constant;term}{coefficient;of;x^{2}}$

We can use these reltaions to obtain values of several symmetric expressions involving $alpha$ and $beta$ in terms of a, b and c.

An expressons in $alpha$ and $beta$ is said to be symmetric if it remaiins unchanged when $alpha$ and $beta$ are intercharged. For instance, $alpha ^{2}+beta ^{2},alpha ^{2}-alpha beta + beta ^{2}$ and $frac{(alpha ^{2}+beta ^{2})}{alpha beta }$ are symmetric expressions in $alpha$ and $beta$ .

Example: If a and c are such that the quadratic polynomial $ax^{2}-5x+c$ has 10 as the sum of zeroes and also as the product of zeroes, fiind a and c.

Solution: Let $alpha ,beta$ be the zeroes of $ax^{2}-5x+c.$ Then

$alpha +beta =frac{5}{a},alpha beta =frac{c}{a}$

As $10=alpha +beta =alpha beta ,$ we get

$10=frac{5}{a},10=frac{c}{a}$

$Rightarrow$ $a=frac{5}{10}=frac{1}{2}$ and c = 10a = 5

Thus, $a=frac{1}{2},c=5$

Example : If $alpha$ and $beta$ are zeros of the quadratic polynomial $x^{2}-5x+6$ . find the value of $alpha ^{4}+beta ^{4}.$

Solution: $alpha +beta =5,alpha beta =6$

We first find $alpha ^{2}+beta ^{2}.$ We have

$alpha ^{2}+beta ^{2}=(alpha +beta )^{2}-2alpha beta =25-2(6)=13$

$alpha ^{4}+beta ^{4}=(alpha ^{2}+beta ^{2})^{2}-2alpha ^{2}beta ^{2}$

$=13^{2}-2(6)^{2}$

$=169-72=97$

Thus, $alpha ^{4}+beta ^{4}=97$

Example: If $large alpha ,beta$ are zeros of $large p(x)=ax^{2}+bx+c$ then obtain quadratic polynomials whose zeros are $large -alpha ,-beta$

Solution: As $large alpha ,beta$ are zeros of $large p(x)=ax^{2}+bx+c$

$large alpha +beta =-frac{b}{a},alpha beta =frac{c}{a}$

$large S=(-alpha )+(-beta )=-(alpha +beta )=frac{b}{a}$

$large P=(-alpha )(-beta )=alpha beta =frac{c}{a}$

Thus, the quadratic expression whose zeros are $large -alpha ,-beta$ is

$large x^{2}-Sx+P$

or $large x^{2}-frac{b}{a}x+frac{c}{a}$

or $large ax^{2}-bx+c$

Sample Questions

(More Questions for each concept available in Login)

Question : 1

For which value of 'a' will the polynomial $large (x-4)^2+(2a-373)^2$ have equal roots.
A. 373		B. $large frac{373}{2}$
C. 0		D. $large -frac{373}{2}$
Right Option : B
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Attention !!!!!

Relationship of Zeroes With Coefficients of Quadratic Polynomial

Relationship of Zeroes With Coefficients of Quadratic Polynomial

Students / Parents Reviews [20]

Hiya Gupta

Ayan Ghosh

Yatharthi Sharma

Hridey Preet

Ayan Ghosh

Shreya Shrivastava

Barkha Arora

Archit Segal

Shreya Shrivastava

Aman Kumar Shrivastava

Shivam Rana

Manya

Barkha Arora

Om Umang

Aman Kumar Shrivastava

Eshan Arora

Manish Kumar

Sharandeep Singh

Aman Kumar Shrivastava

Yogansh Nyasi