Question

How do you evaluate `\frac { 2} { 3} - \frac { 4} { 5} + ( 6\cdot \frac { 1} { 3} ) - \frac { 8} { 2} + \sqrt { 4/ 9} - ( \frac { -3} { 7} ) ^ { 2}`?

Answer 1

`-1213/735`

Explanation:

We'll follow PEDMAS:

PEDMAS

• `color(red)(P)` - Parentheses (also known as Brackets)
• `color(blue)(E)` - Exponents
• `color(green)(M)` - Multiplication
• `color(green)(D)` - Division (this has the same weight as M and so I gave it the same colour)
• `color(brown)(A)` - Addition
• `color(brown)(S)` - Subtraction - again, same weight as A and so the same colour)

We start with:

`2/3-4/5+(6xx1/3)-8/2+sqrt(4/9)-((-3)/7)^2`

First let's see that there is a bracket that needs working:

`2/3-4/5+color(red)((6xx1/3))-8/2+sqrt(4/9)-((-3)/7)^2`

`2/3-4/5+color(red)(2)-8/2+sqrt(4/9)-((-3)/7)^2`

We now have the last two terms that have exponents (the square root is exponent value `1/2`):

`2/3-4/5+2-8/2+color(blue)(sqrt(4/9))-color(blue)(((-3)/7)^2)`

`2/3-4/5+2-8/2+color(blue)(2/3)-color(blue)(9/49)`

There's no multiplication, but we can work a division:

`2/3-4/5+2-color(green)(8/2)+2/3-9/49`

`2/3-4/5+2-color(green)(4)+2/3-9/49`

Let's simplify a little before adding all this up (the 49 in the denominator is going to make for big fractions. If the intent was to only have the `-3` be squared, this answer will need to be modified).

`4/3-4/5-2-9/49`

Now we have a list of addition/subtraction that requires a common denominator. That denominator is `3xx5xx7xx7=735`:

`4/3(245/245)-4/5(147/147)-2(735/735)-9/49(15/15)`

`980/735-588/735-1470/735-135/735=-1213/735`

`1213` is prime and so we can't simplify further.