A force `F=(6hati-8hatj+10hatk)`N produces acceleration of `sqrt(2) ms^(-2)` in a body. Calculate the mass of the body.

A force vecF=(6hati-8hatj+10hatk)N produces acceleration of 1 ms^(-2) in a body. Calculate the mass of the body.

A body, under the action of a force F=6hat(i)-8hat(j)+10hat(k) acceleration of 1ms^(-2) . The mass of this body must be

A body, under the action of a force vec(F)=6hati -8hatj+10hatk , acquires an acceleration of 1ms^(-2) . The mass of this body must be.

A body under the action of a force vec(F)=6hat(i)-8hat(j)N acquires an acceleration of 5ms^(-2) . The mass of the body is

If a body under the action of force (6hati +8hatj-10hatk) N. acquires an acceleration of magnitude 5 ms^-2 . Then the mass of body is

A 10 N force is applied on a body produces an acceleration of 1 m//s^(2) . The mass of the body is

How much force is required to produce an acceleration of 2 m s^(-2) in a body of mass 0.8 kg ?

A force vector applied on a mass is represented as F = 6i - 8j + 10k and acceleration with 1 m//s^(2) . What will be the mass of the body ?

A resultant force of 45 kgf is acting on a body whose acceleration is 10 "m/ sec"^2 . Calculate the mass of the body.

A force produces an acceleration of 4ms^(-2) in a body of mass m_(1) and the same force produces an acceleration of 6ms^(-2) in another body oa mass m_(2) . If the same force is applied to (m_(1)+m_(2)) , then the acceleration will be