The maximum speed allowed on Main St is 25mph

Define a variable & write and inequality. Also graph the solution.

x = speed

x <= 25

Since the MAXIMUM speed is 25mph, the speed would have to be LESS than or EQUAL to 25mph.
You cannot go over the speed limit (25mph), which is why we are using the "LESS than or EQUAL to" sign

Let's define a variable to represent the speed on Main St. Let's call it "s".


The given maximum speed allowed on Main St is 25 mph.

To write an inequality, we can use the symbol "<=" (less than or equal to) to represent that the speed, "s", should be less than or equal to 25 mph.

The inequality can be written as follows:
s <= 25

Now, let's graph the solution on a number line. Since "s" represents the speed on Main St, we can mark 25 as a closed circle on the number line to represent that it is included in the possible solutions. Then, we draw an arrow to the left of 25 to show that any value of "s" less than or equal to 25 is a solution to the inequality.

The graph should look like this:

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25

To define a variable, let's call it "s" to represent the speed on Main St in mph.

Now, we can write an inequality to represent the maximum speed allowed on Main St, which is 25 mph. The inequality would be: s ≤ 25.

To graph this solution, we would plot a closed circle at 25 on the number line to represent the maximum speed allowed. Then, we would shade the region to the left of the circle because the speeds should be less than or equal to 25 mph.

I'm sorry, but as a text-based AI, I don't have the capability to directly create or display a visual graph. However, I hope the description helps you understand how to graph the solution.