Answer:
Jenny
[tex]d_{Jenny}=60mi[/tex]
[tex]t_{Jenny}=x-2[/tex]
Speed is defined by: [tex]s=\frac{d}{t}[/tex], which in this case is [tex]s=\frac{60}{x-2}[/tex]
Maureen
[tex]d_{Maureen} =50mi[/tex]
[tex]t_{Maureen}=x[/tex]
Her speed would be [tex]s=\frac{50}{x}[/tex]
We know that Jenny travels 10 miles per hour faster than Maureen, in other words, the difference between their speeds is 10 miles per hour, which can be expressed as
[tex]Jenny - Maureen = 10mph\\\frac{60}{x-2}-\frac{50}{x}=10[/tex]
Now, we solve for [tex]x[/tex]
[tex]\frac{60x-50x+100}{x(x-2)}=10\\ 10x+100=10x^{2} -20x\\10x^{2} -20x-10x-100=0\\10x^{2}-30x-100=0[/tex]
To solve this quadratic equation, we first divide it by 10,
[tex]\frac{10x^{2}-30x-100}{10} =0\\x^{2} -3x-10=0[/tex]
Now, we look for two numbers which product is 10 and which difference is 3,
[tex]x^{2} -3x-10=0\\(x-5)(x+2)=0[/tex]
Because, 5 times 2 is 10, and 5 minus 2 is 3.
So, the solutions are
[tex]x=5\\x=-2[/tex]
In this case, we are interested only in positive solutions, because the negative one doesn't make sense to the problem.
Finally, we find the time of each person
Jenny: [tex]x-2=5-2=3[/tex]
So, Jenny takes 3 hours.
Maureen: [tex]x=5[/tex]
So, Maureen takes 5 hours.
The speed of each of them,
Jenny: [tex]s=\frac{60}{x-2}=\frac{60}{3} =20mph[/tex]
Maureen: [tex]s=\frac{50}{x}=\frac{50}{5}=10mph[/tex].
