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Solution - Adding, subtracting and finding the least common multiple

(1 - 660) / (20 * (2^{4} * 5^{4}))

(1-660)/(20*(2^4*5^4))

Step by Step Solution

Reformatting the input :

Changes made to your input should not affect the solution:

(1): "^-3" was replaced by "^(-3)". 1 more similar replacement(s)

(2): "3.3" was replaced by "(33/10)".

Step 1 :

 1.1     10 = 2•5

(10)^-3 = (2•5)^(-3) = (2)^(-3) • (5)^(-3)

Equation at the end of step 1 :

                   33
  (5 • (10^-2)) -  (—— • ((2)^(-3)•(5)^(-3)))
                   10

Step 2 :

            33
 Simplify   ——
            10

Equation at the end of step 2 :

                   33
  (5 • (10^-2)) -  (—— • ((2)^(-3)•(5)^(-3)))
                   10

Step 3 :

Multiplying exponents :

3.1 2¹ multiplied by 2³ = 2^{(1 + 3)} = 2⁴

Raising to a Power :

3.2 5¹ multiplied by 5³ = 5^{(1 + 3)} = 5⁴

Equation at the end of step 3 :

                     33  
  (5 • (10^-2)) -  ———————
                  (2⁴•5⁴)

Step 4 :

 4.1     10 = 2•5

(10)^-2 = (2•5)^(-2) = (2)^(-2) • (5)^(-2)

Equation at the end of step 4 :

                                33  
  (5 • ((2)^(-2)•(5)^(-2))) -  ———————
                             (2⁴•5⁴)

Step 5 :

Dividing exponents :

5.1 5¹ divided by 5² = 5^{(1 - 2)} = 5^(-1) = ¹/_5¹ = ¹/₅

Equation at the end of step 5 :

   1       33  
  —— -  ———————
  20    (2⁴•5⁴)

Step 6 :

 6.1      Finding a Common Denominator   The left  20 
 The right  2⁴ • 5⁴ 

 The product of any two denominators can be used
 as a common denominator. 

 Said product is not necessarily the least common 
 denominator.

 As a matter of fact, whenever the two denominators
have a common factor, their product will be bigger
 than the least common denominator. 

Anyway, the product is a fine common denominator and
 can perfectly be used for 
 calculating multipliers, as well as for generating
 equivalent fractions. 

 20 • 2⁴ • 5⁴   will be used as a common denominator.

Calculating Multipliers :

6.2    Calculate multipliers for the two fractions

    Denote the Least Common Multiple by L.C.M
    Denote the Left Multiplier by Left_M
    Denote the Right Multiplier by Right_M
    Denote the Left Deniminator by L_Deno
    Denote the Right Multiplier by R_Deno

   Left_M = L.C.M / L_Deno = 2⁴ • 5⁴

   Right_M = L.C.M / R_Deno = 20

Making Equivalent Fractions :

6.3 Rewrite the two fractions into equivalent fractions

Two fractions are called equivalent if they have the same numeric value.

For example : 1/2 and 2/4 are equivalent, y/(y+1)² and (y²+y)/(y+1)³ are equivalent as well.

To calculate equivalent fraction , multiply the Numerator of each fraction, by its respective Multiplier.

   L. Mult. • L. Num.                     (2⁴•5⁴)  
   ——————————————————  =               ————————————
             Common denominator        20 • (2⁴•5⁴)

   R. Mult. • R. Num.                     33 • 20  
   ——————————————————  =               ————————————
             Common denominator        20 • (2⁴•5⁴)

Adding fractions that have a common denominator :

6.4 Adding up the two equivalent fractions
Add the two equivalent fractions which now have a common denominator

Combine the numerators together, put the sum or difference over the common denominator then reduce to lowest terms if possible:

 (2⁴•5⁴) - (33 • 20)      2⁴•5⁴ - 660
 ———————————————————  =  ————————————
    20 • (2⁴•5⁴)         20 • (2⁴•5⁴)

Final result :

     1 - 660  
  ————————————
  20 • (2⁴•5⁴)

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