Question

the expression 3z⁴+ 12 can be factorized as​

Answer 1

Step-by-step explanation:

Explanation:

You look to see if you spot the appropriate factors strait away. If you can not immediately determine them you have to consider all of the potential ones and reason out which ones work.

So for this question:

Starting point

x

2

can only be

x

×

x

so we have a starting point of:

(

x

+

?

)

(

x

+

?

)

'~~~~~~~~~~~~~~~~~~~~~~~~~~

Consider the constant of

−

12

This is a product so one of the factors is negative and the other positive.

1

×

12

=

12

2

×

6

=

12

3

×

4

=

12

'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

Now consider the

+

x

. This is

1

×

x

So the difference between the factors of 12 must be 1.

The only factors that give us this difference is 3 and 4.

We have

+

x

so the larger has to be the positive.

That means we must have

−

3

and

+

4

'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

Lets try it out!

(

x

−

3

)

(

x

+

4

)

x

(

x

+

4

)

−

3

(

x

+

4

)

x

2

+

4

x

−

3

x

−

12

x

2

+

x

−

12

which is where we started from so these are the factors

'~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~

Factors of

x

2

+

x

−

12

→

(

x

−

3

)

(

x

+

4

)

Answer 2

Step-by-step explanation:

LAW 1: The first law of indices tells us that when multiplying two identical numbers together that have different powers (eg: 2² x 2³), the answer will be the same number to the power of both exponents added together. ... The a represents the number that is divided by itself and m and n represent the powers.