From the question, we know that the solutions of the system [tex](s,c)[/tex] is (14,6), which means the speed of the the boat in calm water, [tex]s[/tex], is 14[tex] \frac{km}{h} [/tex], and the speed of the current, [tex]c[/tex], is 6[tex] \frac{km}{h} [/tex]. To summarize:
[tex]s=14 \frac{km}{h} [/tex] and [tex]c=6 \frac{km}{h} [/tex]
We also know that when the boat travels downstream, the current increases the speed of the boat; therefore to find the speed of the boat traveling downstream, we just need to add the speed of the boat and the speed of the current:
[tex]Speed_{downstream} =s+c[/tex]
[tex]Speed _{downstream} =14 \frac{km}{h} +6 \frac{km}{h} [/tex]
[tex]Speed_{downstream} =20 \frac{km}{h} [/tex]
Similarly, to find the the speed of the boat traveling upstream, we just need to subtract the speed of the current from the speed of the boat:
[tex]Speed_{upstream} =s-c[/tex]
[tex]Speed_{upstream} =14 \frac{km}{h} -6 \frac{km}{h} [/tex]
[tex]Speed_{upstream} =8 \frac{km}{h} [/tex]
We can conclude that the correct answer is C. The team traveled at 8 km per hour upstream and 20 km per hour downstream.
