Turito Academy

Test Prep

Global form fields

Three  blocks of masers m1,m2 and  by massless strings as shown in figure, on a frictionless table. They are Pulled with the force T3=40 N. If  m1=10 kg,m2=6 kg and m3=4kg the tension T2  will  be=...N <img 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" alt="" />

Solution for the question - three blocks of masers m1,m2 and by massless strings as shown infigure, on a frictionless table. they are pulled with the force t3=4