Answer: Equation representing the temperature y at time x is
[tex]y=3x+51[/tex]
Step-by-step explanation:
Since we have given that
At 5:00 a.m., the temperature outside was 66° F.
At x = 5, y = 66
By noon, the temperature had risen to 87° F.
At x = 12, y = 87
We will find "Slope of line first ":
[tex]m=\dfrac{y_2-y_1}{x_2-x_1}\\\\m=\dfrac{87-66}{12-5}\\\\m=\dfrac{21}{7}\\\\m=3[/tex]
So, Equation that models the temperature y at time x would be
[tex](y-66)=3(x-5)\\\\y-66=3x-15\\\\y=3x-15+66\\\\y=3x+51[/tex]
Hence, equation representing the temperature y at time x is
[tex]y=3x+51[/tex]
