First, let's name some variables:
Let's call the number of quarters Paul has: qq
Let's call the number of dimes Paul has: dd
Let's call the number of nickles Paul has: nn
We know:
d = q + 1d=q+1
n = q - 3n=q−3
$0.25q + $0.10d + $0.05n = $4.75$0.25q+$0.10d+$0.05n=$4.75
We can substitute (q + 1)(q+1) for dd and we can substitute (q - 3)(q−3) for nn and solve for qq:
$0.25q + $0.10(q + 1) + $0.05(q - 3) = $4.75$0.25q+$0.10(q+1)+$0.05(q−3)=$4.75
$0.25q + ($0.10 * q) + ($0.10) + ($0.05 * q) - ($0.05 * 3) = $4.75$0.25q+($0.10⋅q)+($0.10)+($0.05⋅q)−($0.05⋅3)=$4.75
$0.25q + $0.10q + $0.10 + $0.05q - $0.15 = $4.75$0.25q+$0.10q+$0.10+$0.05q−$0.15=$4.75
$0.25q + $0.10q + $0.05q + $0.10 - $0.15 = $4.75$0.25q+$0.10q+$0.05q+$0.10−$0.15=$4.75
($0.25 + $0.10 + $0.05)q + ($0.10 - $0.15) = $4.75($0.25+$0.10+$0.05)q+($0.10−$0.15)=$4.75
$0.40q - $0.05 = $4.75$0.40q−$0.05=$4.75
$0.40q - $0.05 + color(red)($0.05) = $4.75 + color(red)($0.05)$0.40q−$0.05+$0.05=$4.75+$0.05
$0.40q - 0 = $4.80$0.40q−0=$4.80
$0.40q = $4.80$0.40q=$4.80
($0.40q)/color(red)($0.40) = ($4.80)/color(red)($0.40)$0.40q$0.40=$4.80$0.40
(color(red)(cancel(color(black)($0.40)))q)/cancel(color(red)($0.40)) = (color(red)(cancel(color(black)($)))4.80)/color(red)(color(black)(cancel(color(red)($)))0.40)
q = 4.80/0.40
q = 12
We can find the number of dimes by substituting 12 for q into the first equation and calculating d:
d = q + 1 becomes:
d = 12 + 1
d = 13
