Question

A cup of lemonade costs l pence

A chocolate bar costs c pence

Write a formula for the total cost (T), in pence, of 5 cups of lemonade and 2 chocolate bars.

Answer 1

Answer:

Example – Simultaneous Equations

If you buy 4 coffees and 3 teas and the total cost is $18, that is not enough

information to work out the cost of one coffee. There are a number of

possibilities ranging from    

Coffee $4.50 and Tea is free (unlikely but possible)

To

Coffee is free and Tea $6 (also unlikely but possible)

The correct answer would be somewhere in between.    

If you go back the next day and buy 3 coffees and 2 teas and the total cost is

$13 then YOU have more information and can work out the correct cost of

each.    

Looking at these as equations where C is the cost of one coffee and T is the

cost of one tea:    

Day 1

4C + 3T = 18    

Day 2

3C + 2T = 13    

With a bit of trial and error you can see that Coffee $3 and Tea $2 is the only

solution that works in both cases.

Try it and see.

Solutions

This is why they are called Simultaneous Equations because both must be

true at the same time.

This is a simple example but you can use algebraic methods to solve much

more difficult problems of this type.

There are three methods of solution:

Substitution of one variable for another.

Elimination of one of the variables

Graphing the two equations to see where they intersect.

A detailed solution for the Tea and Coffee problem looks like this:

Method 1 - Substitution of one variable for another.  

Equation 1 4C + 3T = 18    

Equation 2 3C + 2T = 13    

Rearrange Equation 2 to find T in terms of C

2T = 13 - 3C

T = (13 - 3C)/2

Substitute for T in Equation 1

4C + 3(13 - 3C)/2 = 18

4C + (39 - 9C)/2 = 18

(See why Order of Operations is so important)

4C + 19.5 - 4.5C = 18

4C - 4.5C = 18 - 19.5

-0.5C = -1.5

0.5C = 1.5

In other words half a cup of coffee is $1.50

C = 3

Using that value in Equation 1 (you could use Equation 2 if you wish)

4C + 3T = 18

C = 3 so 12 + 3T = 18

3T = 18 - 12

3T = 6

T = 2

So Coffee costs $3 and Tea costs $2

Method 2 - Elimination of one of the variables  

Equation 1 4C + 3T = 18    

Equation 2 3C + 2T = 13    

You need to get the same number of one variable in each equation so that

you can subtract them and only be left with one variable.

The choices are:

Multiply equation one by 3 and equation two by 4 to be able to get rid of C

or

Multiply equation one by 2 and equation two by 3 to be able to get rid of T

There isn't much in it but the second option is a bit easier

Equation 1 multiplied by 2 becomes 8C + 6T = 36    

Equation 2 multiplied by 3 becomes 9C + 6T = 39    

Subtract equation 1 from equation 2 C + 0 = 3

A coffee costs $3

Then substitute into an original equation to find T as in the first method