Respuesta :
Answer:
The inequality can be represented as:
[tex]10w+125\geq200[/tex]
where [tex]w[/tex] represents the number of weeks in which Maria will be able to buy a phone for least $200.
On solving it we get : [tex]w\geq 7.5[/tex]
Step-by-step explanation:
Given:
Maria wants to buy a phone for at least $200.
She has savings of $125.
She plans to save $10 every week.
To write an inequality for the situation.
Solution:
Let the number of weeks in which Maria will be able to buy a phone be = [tex]w[/tex]
If she saves $10 each week.
Then, in [tex]w[/tex] weeks she will save in dollars = [tex]10w[/tex]
She already has savings = $125
So her total savings in [tex]w[/tex] weeks in dollars will be = [tex]10w+125[/tex]
She wants to buy a phone for at least $200.
Thus, the inequality can be represented as:
[tex]10w+125\geq200[/tex]
Solving for [tex]w[/tex]
Subtracting both sides by 125.
[tex]10w+125-125\geq 200-125[/tex]
[tex]10w\geq 75[/tex]
Dividing both sides by 10.
[tex]\frac{10w}{10}\geq \frac{75}{10}[/tex]
[tex]w\geq 7.5[/tex]
Thus Maria needs at least 7.5 weeks to be able to buy a phone for atleast $200.
