Explanation Given information: The velocity is 2000 ft / s , the horizontal symmetry angle is 3 ° , the rate of spin is 6000 rpm , the atmospheric drag force is 25 lb , the centre distance is 6 in from centre of gravity, the weight of the projectile is 45 lb , the radius of gyration is 2 in . The below figure represent the free body diagram of the system. Figure-(1) Write the expression of drag force due to a force couple system at the mass centre. F = ( D sin β − W cos β ) i ........ (I) Here, the atmospheric drag force is D , the angle about the horizontal axis is β , the weight of the bullet is W and the unit vector in x direction is i . Write the expression of moment about point G . M G = D c sin β j ......... (II) Here, the distance from gravity point is c and the unit vector in y direction is j . Write the expression of moment about the mass centre. M G = ( I ω z − I ′ ϕ cos θ ) ϕ sin θ j ........ (III) Here, the z component of the angular velocity is ω z , the inertia the axis of is I , the inertia about the transverse axis is I ′ and the rate of precision is ϕ . Substitute ( I ω z − I ′ ϕ cos θ ) ϕ sin θ for M G in Equation (II). ( I ω z − I ′ ϕ cos θ ) ϕ sin θ j = D c sin β j ( I ω z − I ′ ϕ cos θ ) ϕ sin θ = D c sin β ........ (IV) Write the expression of angular velocity in z direction. ω z = ψ + ϕ cos θ ........ (V) Here, the rate of spin is ψ . Substitute β for θ and ψ + ϕ cos θ for ω z in Equation (IV). { I ( ψ + ϕ cos θ ) − I ′ ϕ cos β } ϕ sin β = D c sin β D c = I ϕ ( ψ + ϕ cos θ ) − I ′ ϕ 2 cos β D c = ( I ϕ ψ + I ϕ 2 cos θ − I ′ ϕ 2 cos θ ) D c = I ϕ ψ − ( I ′ − I ) ϕ 2 cos θ ........ (VI) Neglect the term ( I ′ − I ) ϕ 2 cos θ from Equation (VI). D c = I ϕ ψ ϕ = D c I ψ ... To determine (b) The exact value of two possible rates of precision.

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Author: BEER

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Chapter 18.3, Problem 18.117P

To determine

(a)

The approximate rate of steady precision.

To determine

(b)

The exact value of two possible rates of precision.

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Chapter 18.3, Problem 18.116P

Chapter 18.3, Problem 18.118P

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(a) The approximate rate of steady precision.

Solution Summary: The author explains the approximate rate of steady precision and the atmospheric drag force due to a force couple system at the mass centre.