1.

If (x–3)and (x–2) are factors of f(x)=xcube+pxsqure+x+q find the value of both p and q​

Answer»

ong>Answer:

let the other factor be x

2

+ax+b. Then

(x

2

+2x+5)(x

2

+ax+b)

≡x

4

+x

3

(2+a)+x

2

(5+b+2a)+x(5a+2b)+5b

≡x

4

+PX

2

+q.

Match the coefficients of like POWERS of x:

For x

3

:2+a=0;∴a=−2

For x:5a+b=0;∴b=5.

For x

2

:5+b+2a=p;∴p=6

For x

0

:5b=q;∴q=25;

or

let y=x

2

so that x

4

+px

2

+q=y

2

+py+q.

Let the roots of y

2

+py+q=0 be r

2

and s

2

.

Since y=x

2

the roots of x

4

+px

2

+q=0 must be ±r,±s.

Now x

2

+2x+5 is a factor of x

4

+px

2

+q; consequently, one PAIR of roots, say r and s, must satisfy the equation x

2

+2x+5=0. It follows that −r and −s must satisfy the equation x

2

−2x+5=0. Therefore, the other factor must be x

2

−2x+5.

∴(x

2

+2x+5)(x

2

−2x+5)≡x

4

+6X

2

+25≡x

4

+px

2

+q.

∴p=6,q=25;

or

Since the remainder must be zero (why)?

12−2p=0,p=6 and q−5p+5=0,q=25.

solution

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