two large storage tanks, T and W contain water. T starts losing at the same time additional water starts flowing into W. The graph below shows the amount of water in each tank over a period of hours. Assume the rates of water loss ad water gain continues as shown. At what number of hours will the amount of water in tank T equal to the amount of water in W
I'd say where the graphs intersect.
To determine the number of hours at which the amount of water in tank T is equal to the amount of water in tank W, we need to analyze the graph provided.
First, let's understand the information conveyed by the graph. The x-axis represents the number of hours, and the y-axis represents the amount of water in each tank. The blue line represents the amount of water in tank T, while the orange line represents the amount of water in tank W.
Since T starts losing water at the same time additional water starts flowing into W, we can observe that the blue line (T) decreases over time, while the orange line (W) increases.
To find the number of hours at which the amounts of water in both tanks are equal, we need to identify the point at which the blue line intersects with the orange line on the graph.
Examine the graph and locate the point of intersection where the blue and orange lines meet. This intersection represents the number of hours at which the water levels in tanks T and W are equal.
Once you identify the point of intersection, determine the corresponding value on the x-axis (number of hours). This value will indicate the number of hours required for the water levels in both tanks to become equal.
Note: If the graph does not show an exact point of intersection, you may need to estimate or interpolate the value by considering the trends and patterns in the graph.
By following this method, you should be able to determine the number of hours at which the amount of water in tank T is equal to the amount of water in tank W.