Solution - Simplification or other simple results

(- 13^{2} \cdot 2^{29} \cdot 3^{29})

(-13^2*2^29*3^29)

Step by Step Solution

Step 1 :

Equation at the end of step 1 :

  (-13²) • (-6²⁹)

Step 2 :

2.1

Negative number raised to an odd power is negative

To show this we begin with (-7)⁵ ,a negative number raised to an odd exponent:

(-7)⁵ can be written as (-7)•(-7)•(-7)•(-7)•(-7)

Now, using the rule that says minus times minus is plus, (-7)⁵ can be written as (49)•(49)•(-7) which is a negative number.

We showed that (-7)⁵ is a negative number

Using the same arguments as above, replacing (-7) by any negative number, and replacing the exponent 5 by any odd exponent, we proved which had to be proved

2.2 6 = 2•3 (-6)²⁹ = (2•3)²⁹ = -2²⁹ • 3²⁹

Equation at the end of step 2 :

  (-13²) • ( -2²⁹•3²⁹)

Step 3 :

 3.1   Negative number raised to an even power is positive

For example let's look at (-7)⁶ , where (-7) , a negative number, is raised to 6 , an even exponent :

(-7)⁶ can be written as (-7)•(-7)•(-7)•(-7)•(-7)•(-7)

Now, using the rule that says minus times minus is plus, (-7)⁶ can be written as (49)•(49)•(49) which in turn can be written as (7)•(7)•(7)•(7)•(7)•(7) or 7⁶ which is positive.

We proved that (-7)⁶ is equal to (7)⁶ which is a positive number

Using the same arguments as above, replacing (-7) by any negative number, and replacing the exponent 6 by any even exponent, we proved which had to be proved

Equation at the end of step 3 :

  13² • ( -2²⁹•3²⁹)

Step 4 :

Final result :

  ( -13²•2²⁹•3²⁹)

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