Answer:
Number of $5 bills = 32
Number of $10 bills = 14
Number of $20 bills = 8
Step-by-step explanation:
Let x number of $5, y number of $10 and z number of $20
The number of $5 bills exceeds twice the number of $10 bills by 4.
Therefore, x = 2y + 4
The number of $20 bills is 6 fewer than the number of $10 bills.
Therefore, z = y - 6
A wallet contains $460 in $5, $10, and $20 bills.
Therefore,
5x + 10y + 20z = 460
Substitute x and y into equation
5(2y+4) + 10y + 20(y-6) = 460
10y + 20 + 10y + 20y - 120 = 460
40y - 100 = 460
40y = 460 + 100
40y = 560
y = 14
x = 2(14) + 4
x = 32
z = 14 - 6
z = 8
Hence, the each type of bills,
Number of $5 bills = 32
Number of $10 bills = 14
Number of $20 bills = 8
Answer:
There are 14 $ 10 bills, 8 $ 20 bills and 32 $ 5 bills.
Step-by-step explanation:
Let x be the number of $10 bills,
∵ The number of $20 bills is 6 fewer than the number of $10 bills,
So, the number of $ 20 bills = x - 6,
Also, the number of $5 bills exceeds twice the number of $10 bills by 4,
So, the number of $ 5 bills = 2x + 4
Thus, the total amount = $ 10 × x + $ 20 ( x - 6 ) + $ 5(2x + 4)
= 10x + 20x - 120 + 10x + 20
= (40x - 100) dollars
According to the question,
40x - 100 = 460
40x = 460 + 100
40x = 560
⇒ x = 14
Hence, the number of $ 10 bills is 14, $ 20 bills is 8 and $ 5 bills is 32.
