Respuesta :
Answer:
1. Dave has 23 ($10 coins) and 18 ($20) coins.
2. Dave has 18 ($10 coins) and 16 ($20) coins.
Explanation:
1.
Let x be the number of $10 coins.
Then, the number of $20 coins will be 41-x.
The equation for the sum of money can be written as:
590 = 10x + 20 * (41-x)
590 = 10x + 820 - 20x
590 - 820 = -10x
-230 / -10 = x
x = 23
This means that Dave has 23 $10 coins and (41-23 = 18) 18 $20 coins that sum up to a face value of $590.
2.
Using the same priciple,
let x be the number of $10 coins
let 34-x be the number of $20 coins
Sum of money equation:
500 = 10x + 20 * (34-x)
500 = 10x + 680 - 20x
500 - 680 = -10x
-180 / -10 = x
x = 18
So, Dave has 18 $10 coins and (34-18 = 16) 16 $20 coins that add up to a face value of $500.
Answer:
1. He has 23 coins in $10, and 18 coins in $20
2. He has 18 coins in $10, and 16 coins in $20
Explanation:
The number of $10 and $20 are two variables that can only be determined simultaneously. The product of the number of each type of coin with the value of each coin gives the total amount owned.
Let the number of of $10 coins owned be x and that of $20 be y
If he has a collection of 41 coins then
x + y = 41
If the face value of the coins is $590
then,
10x + 20y = 590
solving both simultaneously
x + y = 41
x + 2y = 59
y = 59 - 41
= 18
x = 41- 18
= 23
It means he has 23 coins in $10, and 18 coins in $20.
If he has a collection of 34 coins then
x + y = 34
If the face value of the coins is $500
then,
10x + 20y = 500
solving both simultaneously
x + y = 34
x + 2y = 50
y = 50 - 34
= 16
x = 34- 16
= 18
It means he has 18 coins in $10, and 16 coins in $20
