Respuesta :
Answer:
Carmen rode her bicycle at 20 miles per hour while riding to her friend house and while returning home she rode at speed of 5 miles per hour.
Step-by-step explanation:
Given:
Distance traveled = 12 miles
Total number of hours spent on bicycling = 3 hrs.
We need to find the speed while riding her friends house and rate while riding home.
Solution:
Let the speed while riding home be 'x'.
Now given:
On her way there, her average speed was 15 miles per hour faster than on her way home.
Speed while riding to her friends house = [tex]x+15[/tex]
Now we know that;
Time is equal to distance divided by speed.
Time required to visit her friend house [tex]t_1=\frac{12}{x+15}[/tex]
Time required while returning home [tex]t_2=\frac{12}{x}[/tex]
Now we know that;
Total time she spent on bicycling is equal to sum of Time required to visit her friend house and Time required while returning home.
framing in equation form we get;
[tex]t_1+t_2 =3[/tex]
Substituting the values of [tex]t_1[/tex] and [tex]t_2[/tex] we get;
[tex]\frac{12}{x+15}+\frac{12}{x} = 3[/tex]
Now we will use LCM to make the denominator common we get;
[tex]\frac{12x}{x(x+15)}+\frac{12(x+15)}{x(x+15)} = 3[/tex]
Now the denominator are common so we will solve the numerator.
[tex]\frac{12x+12x+180}{x(x+15)}=3\\\\\frac{24x+180}{x(x+15)}=3[/tex]
By cross multiplication we get;
[tex]24x+180=3x(x+15)\\\\24x+180=3x^2+45x\\\\3x^2+45x-24x-180=0\\\\3x^2+21x-180=0[/tex]
taking 3 common we get;
[tex]3(x^2+7x-60)=0[/tex]
Dividing both side by 3 we get;
[tex]\frac{3(x^2+7x-60)}{3}=\frac{0}{3}\\\\x^2+7x-60=0[/tex]
Now by factorizing the equation to find the roots we get;
[tex]x^2+12x-5x-60=0\\\\x(x+12)-5(x+12)=0\\\\(x+12)(x-5)=0[/tex]
Now we will solve separately to find the value of x we get;
[tex]x+12=0 \ \ \ \ Or \ \ \ \ x-5=0\\\\x=-12 \ \ \ \ \ \ \ Or \ \ \ \ \ x=5[/tex]
Now we have got 2 values of x one positive and one negative.
we know that time cannot be negative and hence we will discard the negative value of x and consider the positive value of x.
speed while riding home = [tex]5\ mi/hr[/tex]
Speed of bicycle while visiting her friend house = [tex]x+15 = 5+15 =20\ mi/hr[/tex]
Hence Carmen rode her bicycle at 20 miles per hour while riding to her friend house and while returning home she rode at speed of 5 miles per hour.
