Math, asked by gssamantakghosh20062, 7 months ago

factorize x³+x²-1/x²+1/x³ ​

Answers

Answered by williammartin7c
1

Answer: PLS LIKE

Step-by-step explanation: You can factor by grouping to find:

x

3

+

x

2

x

1

=

(

x

2

1

)

(

x

+

1

)

Then use the difference of squares identity to find:

(

x

2

1

)

(

x

+

1

)

=

(

x

1

)

(

x

+

1

)

(

x

+

1

)

=

(

x

1

)

(

x

+

1

)

2

Explanation:

First factor by grouping:

x

3

+

x

2

x

1

=

(

x

3

+

x

2

)

(

x

+

1

)

=

x

2

(

x

+

1

)

1

(

x

+

1

)

=

(

x

2

1

)

(

x

+

1

)

Then notice that

x

2

1

=

x

2

1

2

is a difference of squares, so we can use the difference of squares identity [

a

2

b

2

=

(

a

b

)

(

a

+

b

)

] to find:

(

x

2

1

)

(

x

+

1

)

=

(

x

1

)

(

x

+

1

)

(

x

+

1

)

=

(

x

1

)

(

x

+

1

)

2

Alternatively, notice that the sum of the coefficients (

1

+

1

1

1

) is

0

, so

x

=

1

is a zero of this cubic polynomial and

(

x

1

)

is a factor.

Divide

x

3

+

x

2

x

1

by

(

x

1

)

to get

x

2

+

2

x

+

1

:

enter image source here

Then recognise that

x

2

+

2

x

+

1

=

(

x

+

1

)

2

is a perfect square trinomial. One little trick to spot this one is that

11

2

=

121

, the

1

,

2

,

1

matching the coefficients of the quadratic and

1

,

1

matching the coefficients of the linear factor.

You can factor by grouping to find:

x

3

+

x

2

x

1

=

(

x

2

1

)

(

x

+

1

)

Then use the difference of squares identity to find:

(

x

2

1

)

(

x

+

1

)

=

(

x

1

)

(

x

+

1

)

(

x

+

1

)

=

(

x

1

)

(

x

+

1

)

2

Explanation:

First factor by grouping:

x

3

+

x

2

x

1

=

(

x

3

+

x

2

)

(

x

+

1

)

=

x

2

(

x

+

1

)

1

(

x

+

1

)

=

(

x

2

1

)

(

x

+

1

)

Then notice that

x

2

1

=

x

2

1

2

is a difference of squares, so we can use the difference of squares identity [

a

2

b

2

=

(

a

b

)

(

a

+

b

)

] to find:

(

x

2

1

)

(

x

+

1

)

=

(

x

1

)

(

x

+

1

)

(

x

+

1

)

=

(

x

1

)

(

x

+

1

)

2

Alternatively, notice that the sum of the coefficients (

1

+

1

1

1

) is

0

, so

x

=

1

is a zero of this cubic polynomial and

(

x

1

)

is a factor.

Divide

x

3

+

x

2

x

1

by

(

x

1

)

to get

x

2

+

2

x

+

1

:

enter image source here

Then recognise that

x

2

+

2

x

+

1

=

(

x

+

1

)

2

is a perfect square trinomial. One little trick to spot this one is that

11

2

=

121

, the

1

,

2

,

1

matching the coefficients of the quadratic and

1

,

1

matching the coefficients of the linear factor.

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