Jason bought 38 stamps and 17 postcards
Solution:
Let "a" be the number of stamps bought
Let "b" be the number of postcards bought
The number of stamps was 4 more than twice the number of post cards
Therefore,
Number of stamps bought = 4 + 2(number of post cards)
a = 4 + 2b ------- eqn 1
Jason bought both 41 cent stamps and 26 cent postcards and spent $20.28
1 dollar is equal to 100 cents
Thus, $ 20.28 is equal to 2028 cents
Therefore, we frame a equation as:
[tex]41 \times a + 26 \times b = 2028[/tex]
41a + 26b = 2028 ----------- eqn 2
Let us solve eqn 1 and eqn 2
Substitute eqn 1 in eqn 1
41(4 + 2b) + 26b = 2028
164 + 82b + 26b = 2028
164 + 108b = 2028
108b = 1864
[tex]b = 17.25 \approx 17[/tex]
Substitute b = 17 in eqn 1
a = 4 + 2(17)
a = 4 + 34
a = 38
Thus Jason bought 38 stamps and 17 postcards
