Respuesta :
Answer with Step-by-step explanation:
Let there be d dimes and q quarters
A woman has 21 total coins in her pocket.
⇒ d+q=21 ------(1)
1 dime=$ 0.1
1 quarter=$ 0.25
The total value of her change is $3.90
⇒ 0.1d+0.25q=3.90
Multiplying both sides by 100,we get
10d+25q=390 --------(2)
(2)-10×(1)
10d+25q-10d-10q=390-210
15q=180
Dividing both sides by 15, we get
q=12
Putting value of q in (1),we get
d=9
Hence, Number of dimes=9
and number of quarters=12
Write the number of dimes, then the number of quarters separated by a comma.
9,12
Answer:
The woman has 12 quarters and 9 dimes.
Step-by-step explanation:
Givens
- The woman have 21 total coins.
- The coins are distributed between dimes ad quarters.
- The total value of her change is $3.90.
With this information we can construct a system of equations, where [tex]d[/tex] is dimes and [tex]q[/tex] is quarters.
[tex]d+q=21[/tex], because there are 21 coins between dimes and quarters.
Now, we know that one dime values 10 cents, and one quarter values 25 cents.
[tex]0.10d+0.25q=3.90[/tex], because the woman has $3.90 in total.
Then, we isolate [tex]d[/tex] in the first expression
[tex]d=21-q[/tex]
And we substitute it in the second expression
[tex]0.10d+0.25q=3.90\\0.10(21-q)+0.25q=3.90\\2.1-0.10q+0.25q=3.90\\0.15q=3.90-2.1\\q=\frac{1.80}{0.15} \\q=12[/tex]
Then, we use this value to find the other one
[tex]d=21-q\\d=21-12\\d=9[/tex]
Therefore, the woman has 12 quarters and 9 dimes.
