Respuesta :
Answer:
Fixed rate is $60.
Step-by-step explanation:
Let us consider per student charge be 'x'.
Let us consider fixed rate be 'b'
Given:
I rent a gym for $150 for 30 students.
So we can say that;
Total amount is equal to sum of number of students multiplied by per student charge and fixed rate.
framing in equation form we get;
[tex]30x+b=150 \ \ \ \ equation \ 1[/tex]
Also Given:
another time I rent the gym for $270 for 70 students.
So we can say that;
Total amount is equal to sum of number of students multiplied by per student charge and fixed rate.
framing in equation form we get;
[tex]70x+b=270 \ \ \ \ equation \ 2[/tex]
Now we will subtract equation 1 from equation 2 we get;
[tex]70x+b-(30x+b)=270-150\\\\70x+b-30x-b=120\\\\40x=120[/tex]
Dividing both side by 40 we get;
[tex]\frac{40x}{40}=\frac{120}{40}\\\\x=\$3[/tex]
Now we will substitute the value of x in equation 1 we get;
[tex]30x+b=150\\\\30\times3+b=150\\\\90+b=150\\\\b=150-90 =\$60[/tex]
So we can say that the equation can be written as;
[tex]y =3x+60[/tex]
Hence we can say that fixed rate is $60 and per student charge is $3.
Answer:
The fixed rate for the gym is $[tex]60[/tex].
Step-by-step explanation:
Given the price to rent a gym is $[tex]150[/tex] for [tex]30[/tex] students.
And another rent of the gym is $[tex]270[/tex] for [tex]70[/tex] students
Let [tex]x[/tex] be the number of student and [tex]y[/tex] be the amount of the gym.
We will write equation of the line representing total cost in slope-intercept form of equation.
[tex]y=mx+b[/tex]
let us find the slope
[tex]m=\frac{y_2-y_1}{x_2-x_1}\\\\m=\frac{270-150}{70-30}\\\\m=\frac{120}{40}\\\\m=3[/tex]
Now, we will find y-intercept. Plug [tex]m=3[/tex] and coordinates of point [tex](30,150)[/tex] in slope-intercept form of equation.
[tex](y-y_1)=m(x-x_1)\\y-150=3(x-30)\\y-150=3x-90\\y=3x-90+150\\y=3x+60[/tex]
Since y-intercept represents the initial value. Therefore, the fixed rate for the gym is $[tex]60[/tex].
