"Solving Process:"
Let:
x= "the price of the notebooks"
y= "the price of the boxes of crayons"
Now, formulate equations with reference to their purchases; that is,
color(red)("Marcus ": 5x+10y=31->eq.1
color(blue)("Nina ": 10x+5y=24.50->eq.2
Then, solve the equations simultaneously as follows:
Multiply eq.1 with 2 to eliminate the terms with x variable in both equations.
eq.1-> color(red)(5x+10y=31) }-2
eq.2->color(blue)(10x+5y=24.5
"so that the eq.1 becomes"
eq.1->color(red)(cancel(-10x)-20y=-64
eq.2->color(blue)(cancel(10x)+5y=24.5
Then find the difference of the remaining terms to get the equation as shown below and find the value of y.
color(red)(-15y=-37.5); divide both sides by -15 to isolate y
color(red)((cancel(-15)y)/(cancel(-15))=(-37.5)/(-15))
color(red)(y=2.50; price for the boxes of crayons
Now, find the value of x, the price of the notebooks, by using either of the equations formulated. Here, eq.1 is used to solve for x.
color(red)(5x+10y=31); where color(red)(y=2.50)
color(red)(5x+10(2.50)=31); simplify
color(red)(5x+25=31); combine like terms
color(red)(5x=31-25); simplify
color(red)(5x=6); isolate x by dividing both sides by 5
color(red)(x=1.20); the price of the boxes of crayons
"Checking Process":
where: x=1.20 and y=2.50
Eq.1
5x+10y=31
5(1.20)+10(2.50)=31
6+25=31
31=31
Eq.2
10x+5y=24.5
10(1.20)+5(2.50)=24.5
12+12.5=24.5
24.5=24.5
