Respuesta :
Answer:
A) Object B
B) Object C
C) [tex]\frac{m_A}{m_B} = \frac{7}{6}[/tex]
Explanation:
We should apply Newton's Second Law to each object to find their masses.
Object A:
[tex]F = m_Aa_A = m_A(6)\\m_A = \frac{F}{6}[/tex]
Object B:
[tex]F = m_Ba_B = m_B(3)\\m_B = \frac{F}{3}[/tex]
Object C:
[tex]F = m_Ca_C = m_C(7)\\m_C = \frac{F}{7}[/tex]
A) According to above results, object B has the largest mass.
B) According to above results, object C has the smallest mass.
C) [tex]\frac{m_A}{m_B} = \frac{F/6}{F/7} = \frac{7}{6}[/tex]
This question is a clear example of the definition of mass. According to above results; higher the mass, smaller the acceleration. This means that mass is resistance to acceleration.
Explanation:
Force, F = M * a
Where,
M = mass
a = acceleration
Object A
F = Ma * 6
= 6Ma
Object B
F = Mb * 3
= 3Mb
Object C
F = Mc * 7
= 7Mc
A.
Calculating their masses,
Object A
F/6 = Ma
Object B
F/3 = Mb
Object C
F/7 = Mc
Object B of mass, F/3 has the largest mass.
B.
Object C of mass, F/7 has the smallest mass.
C.
Mass of Object A : Mass of Object B
= F/6 : F/3
= 1 : 2
