Math, asked by abhi5863, 1 year ago

find the value of k for which one root of the quadratic equation is kx^2 - 14x + 8 =0 is 2

Answers

Answered by ranjeet5994

The value of K is 5
because the root of quadratic equation satisfied when put x=2.

ranjeet5994: u my be calculation mistake

abhi5863: уα..υ я яιgнт

abhi5863: вυт αgαιи αиѕ ιѕ ¢σмє 5

ranjeet5994: follow the process

abhi5863: σк

abhi5863: уσυ gινє мє α ρι¢ σf уσυя ¢αℓ¢υℓαтισиѕ

ranjeet5994: ohh! sorry the correct ans is 5

ranjeet5994: U r right

abhi5863: σк

abhi5863: тнαик уσυ

Answered by Anonymous

Find the value of k for which one of the roots of the quadratic equation kx² - 14x + 8 = 0 is 2 .

k = 5

• An equation of degree 2 is know as quadratic equation .

• Roots of an equation is defined as the possible values of the unknown (variable) for which the equation is satisfied.

• The maximum number of roots of an equation will be equal to its degree.

• A quadratic equation has atmost two roots.

• The general form of a quadratic equation is given as , ax² + bx + c = 0 .

• The discriminant of the quadratic equation is given as , D = b² - 4ac .

• If D = 0 , then the quadratic equation would have real and equal roots .

• If D > 0 , then the quadratic equation would have real and distinct roots .

• If D < 0 , then the quadratic equation would have imaginary roots .

The given quadratic equation is ;

kx² - 14x + 8 = 0

According to the question,

One of the roots of the given quadratic equation is 2 , thus x = 2 will satisfy the given quadratic equation.

Thus,

=> kx² - 14x + 8 = 0

=> k•2² - 14•2 + 8 = 0

=> 4k - 28 + 8 = 0

=> 4k - 20 = 0

=> 4k = 20

=> k = 20/4

=> k = 5

Hence,

The required value of k is 5 .

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