Question
A farmer had a plant farm. The garden is 10 m long and he wants at least 60 square m of are. What’s the smallest width of the garden he could do
Answers
GPT-4o mini
To find the smallest width of the garden that would give the farmer at least 60 square meters of area, we can use the formula for the area of a rectangle:
\[
\text{Area} = \text{Length} \times \text{Width}
\]
In this case, the length of the garden is given as 10 meters, and we need the area to be at least 60 square meters. Let \( w \) be the width of the garden.
Using the area formula, we have:
\[
10 \times w \geq 60
\]
To find the minimum width, we can solve for \( w \):
\[
w \geq \frac{60}{10}
\]
\[
w \geq 6
\]
Therefore, the smallest width of the garden that the farmer could use to achieve at least 60 square meters of area is **6 meters**.
\[
\text{Area} = \text{Length} \times \text{Width}
\]
In this case, the length of the garden is given as 10 meters, and we need the area to be at least 60 square meters. Let \( w \) be the width of the garden.
Using the area formula, we have:
\[
10 \times w \geq 60
\]
To find the minimum width, we can solve for \( w \):
\[
w \geq \frac{60}{10}
\]
\[
w \geq 6
\]
Therefore, the smallest width of the garden that the farmer could use to achieve at least 60 square meters of area is **6 meters**.