Let d be the number of dimes and q be the number of quarters.

Then you have this system of two equations

  d +   q =   77,        (1)    (counting dimes)
10d + 25q = 1280.        (2)    (counting cents)


To solve it, multiply eq(1) by 10. You will have

10d + 10q =  770,        (1')
10d + 25q = 1280.        (2')


Next subtract (1') from (2'). You will get

25q - 10q = 1280 - 770,

15q = 510  ====>  q =  = 34.


The parking meter contains 34 quarters and 77-34 = 43 dimes.


Check.   43*10 + 34*25 = 33*10 + 34*25 = 1280.    !  Correct !


Answer.  34 quarters and 43 dimes.

Let  q be the number of quarters.

Then the number of dimes is (77-q). 

The quarters contribute 25q cents toward the total.
The dimes contribut 10*(77-q) toward the total.

The total is  25q + 10*(77-q).

From the other side, it is 1280 cents, according to the condition.

It gives you an equation

25q + 10*(77-q) = 1280.     


Simplify and solve for q:

25q + 770 - 10q = 1280 

15q = 1280 - 770  

15q = 510  ====>  q =  = 34.


The parking meter contains 34 quarters and 77-34 = 43 dimes.


You got the same answer.

Imagine for a minute that all coins in the parking meter are DIMES.

Then you would have 10*77 = 770 cents in the parking meter.

But in reality the money amount there is 1280 cents, which is 1280-770 = 510 cents more than 770 cents.

Why we have this difference ?  - But of course, because we counted 25-cent quarters as 10-cent coins.

Then it is clear, that the number of quarters is   =  = 30 + 4 = 34.


And you get the same answer.