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Simon measures the depth of water in centimeters, in his fish tank at the end of each day. His measurements are shown. Which equation shows the water depth, y, in the fish tank after x days?

Simon measures the depth of water in centimeters, in his fish tank at the end of each-example-1
Simon measures the depth of water in centimeters, in his fish tank at the end of each-example-1
Simon measures the depth of water in centimeters, in his fish tank at the end of each-example-2
User Weaming
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1 Answer

21 votes
21 votes

Solution:

Given:

To get the equation, we pick two points to get the rate of change of depth per day.

Using the points (1,18) and (2,17.5), then


\begin{gathered} slope,m=(y_2-y_1)/(x_2-x_1) \\ where; \\ x_1=1,y_1=18 \\ x_2=2,y_2=17.5 \\ \\ Hence, \\ m=(17.5-18)/(2-1) \\ m=-(0.5)/(1) \\ m=-0.5 \\ m=-(1)/(2) \end{gathered}

Using the form of a linear equation,


\begin{gathered} y=mx+b \\ Using\text{ the point }(1,18), \\ x=1 \\ y=18 \\ m=-0.5 \\ \\ 18=-0.5(1)+b \\ 18=-0.5+b \\ 18+0.5=b \\ b=18.5 \end{gathered}

Hence,


\begin{gathered} m=-(1)/(2) \\ b=18.5 \\ \\ Using\text{ the equation;} \\ y=mx+b \end{gathered}

Therefore, the equation that shows the water depth, y in the fish tank after x days is;


y=-(1)/(2)x+18.5

Simon measures the depth of water in centimeters, in his fish tank at the end of each-example-1
User Anand Vidvat
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2.8k points