Answer:
65.14925 kg
Explanation:
Center of mass before the exchange
[tex]X_{c1}=\dfrac{0+1.5\times 20+3\times 85}{85+20+x}[/tex]
Center of mass after exchange
[tex]X_{c2}=\dfrac{0.35\times 85+(0.35+1.5)\times 20+(3+0.35)\times x}{85+20+x}[/tex]
The center of mass remains constant so [tex]X_{c1}=X_{c2}[/tex]
[tex]\dfrac{0+1.5\times 20+3\times 85}{85+20+x}=\dfrac{0.35\times 85+(0.35+1.5)\times 20+(3+0.35)\times x}{85+20+x}\\\Rightarrow 1.5\times 20+3\times 85=0.35\times 85+(0.35+1.5)\times 20+(3+0.35)\times x\\\Rightarrow x=\dfrac{1.5\times 20+3\times 85-0.35\times 85-(0.35+1.5)\times 20}{3+0.35}\\\Rightarrow x=65.14925\ kg[/tex]
Mass of Carmelita is 65.14925 kg
