Answer:
Shopper spend on Apples $3 , on Grapes $4 and on Oranges $3.5
Step-by-step explanation:
We are given:
Apples: $(2x) per pound
Grapes: $(6x - 5) per pound
Oranges: $(x + 2) per pound
A shopper purchases one pound each of apples, grapes, and oranges and spends $10.50.
It can be written as: [tex]2x+6x-5+x+2=10.50[/tex]
We need to find how much the shopper spend on each fruit.
Solution:
Now, we need to find value of x by solving equation
[tex]2x+6x-5+x+2=10.50[/tex]
Solving:
[tex]2x+6x+x+2-5=10.50\\9x-3=10.50\\9x=10.50+3\\9x=13.5\\x=\frac{13.5}{9}\\x=1.5[/tex]
The value of x is: x=1.5
Now finding cost of one pound each fruit by putting x=1.5
Apples: $(2x) per pound
$2x= 2(1.5) = $3
Grapes: $(6x - 5) per pound
$(6x-5) = (6(1.5)-5)= $4
Oranges: $(x + 2) per pound
$(x+2)=(1.5+2)=$3.5
So, shopper spend on apples $3, on Grapes $4 and on Oranges $3.5.
