Respuesta :
Answer:
Fc = [ - 4.45 * 10^-8 j ] N Â
Explanation:
Given:-
- The masses and the position coordinates from ( 0 , 0 ) are:
    Sphere A : ma = 80 kg , ( 0 , 0 )
    Sphere B : ma = 60 kg , ( 0.25 , 0 )
    Sphere C : ma = 0.2 kg , ra = 0.2 m , rb = 0.15
- The gravitational constant G = 6.674×10−11 m3⋅kg−1⋅s−2
Find:-
what is the gravitational force on C due to A and B?
Solution:-
- The gravitational force between spheres is given by:
            F = G*m1*m2 / r^2
Where, r : The distance between two bodies (sphere).
- The vector (rac and rbc) denote the position of sphere C from spheres A and B:-
 Determine the angle (α) between vectors rac and rab using cosine rule:
          [tex]cos ( \alpha ) = \frac{rab^2 + rac^2 - rbc^2}{2*rab*rac} \\\\cos ( \alpha ) = \frac{0.25^2 + 0.2^2 - 0.15^2}{2*0.25*0.2}\\\\cos ( \alpha ) = 0.8\\\\\alpha = 36.87^{\circ \:}[/tex]
 Determine the angle (β) between vectors rbc and rab using cosine rule:
          [tex]cos ( \beta ) = \frac{rab^2 + rbc^2 - rac^2}{2*rab*rbc} \\\\cos ( \beta ) = \frac{0.25^2 + 0.15^2 - 0.2^2}{2*0.25*0.15}\\\\cos ( \beta ) = 0.6\\\\\beta = 53.13^{\circ \:}[/tex]
- Now determine the scalar gravitational forces due to sphere A and B on C:
    Between sphere A and C:
         Fac = G*ma*mc / rac^2
         Fac = (6.674×10−11)*80*0.2 / 0.2^2 Â
         Fac = 2.67*10^-8 N
         vector Fac = Fac* [ - cos (α) i + - sin (α) j ]
         vector Fac = 2.67*10^-8* [ - cos (36.87°) i + -sin (36.87°) j ]
         vector Fac = [ - 2.136 i - 1.602 j ]*10^-8 N
    Between sphere B and C:
         Fbc = G*mb*mc / rbc^2
         Fbc = (6.674×10−11)*60*0.2 / 0.15^2 Â
         Fbc = 3.56*10^-8 N
         vector Fbc = Fbc* [ cos (β) i - sin (β) j ]
         vector Fbc = 3.56*10^-8* [ cos (53.13°) i - sin (53.13°) j ]
         vector Fbc = [ 2.136 i - 2.848 j ]*10^-8 N
- The Net gravitational force can now be determined from vector additon of Fac and Fbc:
         Fc = vector Fac + vector Fbc
         Fc = [ - 2.136 i - 1.602 j ]*10^-8  + [ 2.136 i - 2.848 j ]*10^-8
         Fc = [ - 4.45 * 10^-8 j ] N Â
