Answer:
600m/s
Step-by-step explanation:
Step 1
First step is to use declare variables for Bill's and Susan's cruising speed.Let [tex]x[/tex] the speed of Susan's plane. This implies that Bill's plane is [tex]x+30[/tex]
Step 2
To calculate the time traveled given distance and speed we use the formula
[tex]t=\frac{d}{s}[/tex] where [tex]s[/tex] is speed, [tex]d[/tex] is the distance, [tex]t[/tex] is the time.
The time taken by Bill's plane is [tex]t_b=\frac{800}{x+30}.[/tex]
The time taken by Susan's plane is [tex]t_s=\frac{760}{x}[/tex]
Step 3
Since the time taken by both planes is the same, we solve for Susan's speed as shown below,
[tex]t_b=t_s\\\implies \frac{800}{x+30} =\frac{760}{x} \\\implies 800x=760(x+30)\\\implies 800x=760x+22\,800\\\implies 800x-760x=22\,800\\\implies 40x=22\,800\\\implies x=\frac{22\,800}{40} =570[/tex]
Step 4
Since Susan's plane travels at a speed of 570mph, we can inder that Bill's plane travels at a speed of (570+30)mph=600mph.
