Question

Carla spent two-fifths of her savings on a bracelet and had $\$ 9$ left over. How many dollars did Carla's bracelet cost?

Answer 1

Answer: $6

Explanation:

To find out how much Carla's bracelet cost, we can start by calculating how much of her savings she spent on the bracelet.

We know that Carla spent two-fifths of her savings on the bracelet, and she had $9 left over. This means that the amount she spent on the bracelet is equal to three-fifths of her savings, since she had $9 left over.

To find the value of three-fifths of Carla's savings, we can set up an equation:

$\frac{3}{5} \times \text{savings} = 9$

To solve this equation, we can multiply both sides by $\frac{5}{3}$ to isolate the variable:

$\text{savings} = \frac{9 \times 5}{3} = 15$

So Carla's total savings is $15.

Now we can find the cost of the bracelet by multiplying Carla's savings by the fraction she spent:

$\frac{2}{5} \times 15 = 6$

Therefore, Carla's bracelet cost $6.

Answer 2

The cost of the bracelet was
`\$6`

Explanation:

Let

x------> amount of Carla's savings

y-----> the cost of bracelet

we know that

`y=(2)/(5)x` -----> equation A

`1-(2)/(5)=(3)/(5)`

so

`9=(3)/(5)x` ----> solve for x

`x=9*5/3=\$15`

substitute the value of x in the equation A and solve for y

`y=(2)/(5)(15)=\$6`