Answer:
a = 60
b = 80, and
c = 100
Step-by-step explanation:
Be patient, this requires a few tedious steps.
We can take the first expression and pick one of the unknowns, I'll choose a, and rearrange the expressions such that a is expressed as a function of b and c.
Since:
a/3 = b/4 = c/5
We can separate out the values of b and c and express them as a function of a.
For example, a/3 = b/4 can be rewritten as
a/3 = b/4
4a = 3b
b = (4/3)a
When we're ready, we can substitute this value for b in the second equation, thereby eliminating b from the 2nd equation.
First, let's do the same for c:
a/3 = c/5
5a = 3c
c = (5/3)a
Now we can use the values for both b and c expressed only with "a" as the variable. Use these values for b ((4/3)a) and c ((5/3)a) in the second equation:
240 - b = a + c
240 - (4/3)a = a + (5/3)a
240 = = a + (5/3)a + (4/3)a
240 = (3/3)a + (5/3)a + (4/3)a
240 = (12/3)a
a = (240)*(3/12)
a = 60
Now that we have a, we can use the relationships we established at the start:
b = (4/3)a
b = (4/3)(60)
b = 80
c = (5/3)a
c = (5/3)(60)
c = 100
==
Summary
a = 60
b = 80, and
c = 100
============
Do these work?
Check the numbers for 240 - b = a + c
240 - 80 = 60 + 100 ?
160 = 160 YES
And does a/3 = b/4 = c/5?
a/3 = 60/3 = 20
b/4 = 80/4 = 20
c/5 = 100/5 = 20 YES
