The Spanish Club is selling churros as a fundraiser. If its goal is to raise at least $150, how many churros must it sell at $1.25 each to meet that goal? Write and solve an inequality.
(1 point)
1.25 150, c≥120
1.25 2150; c≥100
150c21.25; 2120
150c21.25; c≥25
Let c be the number of churros the Spanish Club must sell.
The inequality representing the goal of raising at least $150 would be:
1.25c ≥ 150
To solve for c, divide both sides of the inequality by 1.25:
c ≥ 150/1.25
c ≥ 120
Therefore, the Spanish Club must sell at least 120 churros at $1.25 each to meet its goal of raising at least $150.
Let c represent the number of churros the Spanish Club must sell.
Since each churro is sold at $1.25, the total amount raised can be calculated by multiplying the number of churros sold by $1.25:
1.25c ≥ 150
To solve for c, we divide both sides of the inequality by $1.25:
c ≥ 150 / 1.25
c ≥ 120
Therefore, the Spanish Club must sell at least 120 churros to meet their goal of raising at least $150.
To solve this problem, you need to write and solve an inequality. Let's call the number of churros sold "c" and the price per churro "$1.25".
The total amount of money raised from selling churros can be found by multiplying the number of churros sold by $1.25:
Total amount = $1.25 x c
The goal is to raise at least $150, so we can write an inequality:
$1.25 x c ≥ $150
To solve for c, divide both sides of the inequality by $1.25:
c ≥ $150 / $1.25
Simplifying the right side:
c ≥ 120
So, the Spanish Club must sell at least 120 churros at $1.25 each to meet the goal of raising at least $150.