Worked Example for Engineering Mechanics-I

1. A man pull with force of 300 N on a rope attached to a building as shown in fig, what are the horizontal and vertical components of the force exerted by the rope at point A.

Solution:

tanb =6/8=0.75, b=tan-1_(0.75)=36.870 _a=900_-36.870_=53.130 _{possible to use both bor a} Fx=Fcos36.870_{=300N cos36.87}0_{= 300sin 53.13}0

Fy= -Fsin36.870 _{=-300N sin36.87}0_{=-300N cos53.13}0

2.The cable AB prevents bar OA from rotating clockwise about the pivot O. If the cable tension 750N,determine the n- and t-components of this force acting on point A of the bar.

AB2 _{= 1.2}2 _{+ 1.5}2 _{-2*1.2*1.5 cos120}0 _=2.34m sina/1.2 = sin 1200_{/2.34 , a=26.3}0

Tn=Tsin a=750sin 26.30 _{=333 N Tt = -Tcosa =-750cos26.3}0 _{= -672 N} 300N a

3.In the design of a control mechanism, it is determined that rod AB transmits a 260-N force P to the crank BC.Determine the x and y scalar components of P

Solution:

hypotenuse= 52 ₊₁₂2 ₌₁₃

Px=- Pcos 210_{=-260(12/13)= -240 N Py=-Psin21}0 _{-260(5/13)= - 100 N}

4.Determine the resultant R of the two forces shown by a) applying the parallelogram rule for vector addition b) summing scalar components.

Solution:

Laws of cosines:

R2₌₆₀₀2₊₄₀₀2 _{-2*600*400cos 60}0= _529N Laws of sines:

529/sin600 _{=600/sin a ° , a=79.1}0

b) Rx=SFx= 600cos 600 _{-400= -100 N Y} Ry=SFy = 600sin 600_{+0= 520 N}

SO , R= -100i +520 j N X 5.

6.If the equal tension T in the pulley cable are 400 N, express in vector notation the force R exerted on the pulley by the two tensions. Determine the magnitude of R.

Solution: a

RY=SFY=400sin600_{=346 N} R = 600 i +346 j

R= 6002 ₊₃₄₆2 _{=693 N}

7.Determine the resultant of the three forces below.

Solution:

 F x = 350 cos 25o _{+ 800 cos 70}o _{- 600 cos 60}o

= 317.2 + 273.6 - 300 = 290.8 N

 F y = 350 sin 25o _{+ 800 sin 70}o _{+ 600 sin 60}o

= 147.9 + 751 + 519.6 = 1419.3 N i.e. F = 290.8 N i + 1419.3 N j Resultant, F F    N    290 8 1419 3 1449 1419 3 290 8 78 4 2 2 1 0 . . tan . . .  F = 1449 N 78.4o

8.The two structural members, one of which is in tension and the other in compression, exert the indicated forces on joint O. Determine the magnitude of the resultant R of the two forces and the angle which R makes with the positive x-axis.(exercise)

9.A force F of magnitude 40N is applied to the gear. Determine the moment of F about point O.

Solution:

10.A 200 N force acts on the bracket as shown determine the moment of force about “A”

Given F=200N θ = 45o

Required MA =?

Solution Resolve the force into components F1 am F2 F1= F cosθ ,F1=200 cosine 45o _=141.42N.

F2= F sin θ, F2 = 200 sin 45o_{= 2.468N.} We know that MA = 0

MA = moment produce due to component F1+ moment produce due to component F2. =F1 x r1+ F2 x r2.

Let us consider that clock wise moment is + ve. MA = F1 x r1+ F2 x r2

= - 141.42 x 0.1 + 2.468 x (0.1 +0.1) = - 13.648 N

= 13 .648 N anti clock wise.

11.Determine the moment of couple acting on the moment shown(COUPLE)

Given

F1=200 N, L1=4m F2=200 N ,L2 = 2m.

Required Moment of couple = M =? Working Formula M = F x r.

Solution

Put the values in working formula M= 200(4+2)

=1200 N. m

Given F1=F2 =90lb F3 = F4 = 120lb.

Required Moment of couple = M=?

Solution The moment of couple can be determined at any point for example at A, B or D. Let us take the moment about point B

MB = Σ F R.

= -F1 x r1 – F2 x r2 .

= - 90(3) – 120 (1) = - 390 lb ft

Result MB = MA=MD =390 lb .ft counter clock wise.

Moment of couple = 390 lb.ft count clockwise

13. For each case illustrated in Fig. below , determine the moment of the force about point O . solution (scalar analysis)

The line of action of each force is extended as a dashed line in order to establish the moment arm

d . Also illustrated is the tendency of rotation of the member as caused by the force. Furthermore,

Thus, Fig. a MO = (100 N)(2 m) = 200 N. m CW Fig b MO = (50 N)(0.75 m) = 37.5 N.m.CW Fig c MO = (40 lb)(4 ft + 2 cos 30_ ft) = 229 lb.ftb CW Fig. d MO = (60 lb)(1 sin 45_ ft) = 42.4 lb.ft CCW Fig e MO = (7 kN)(4 m - 1 m) = 21.0 kN.m. CCW

14.Determine the resultant moment of the four forces acting on the rod shown in Fig. below about point O .

SOLUTION

Assuming that positive moments act in the +k direction, i.e., counterclockwise, we have + (MR)O = _Fd;

(MR)O = -50 N(2 m) + 60 N(0) + 20 N(3 sin 300 _{m) -40 N(4 m + 3 cos 30}0_m) (MR)O = -334 N. m = 334 N.m CW

For this calculation, note how the moment-arm distances for the 20-N and 40-N forces are established from the extended (dashed) lines of action of each of these forces.

15.Determine the moment produced by the force F in Fig. tree shown below a about point O . Express the result as a Cartesian vector.

solution

As shown in Fig. b , either rA or rB can be used to determine the moment about point O . These position vectors are rA = {12k} m and rB = {4i + 12j} m

Force F expressed as a Cartesian vector is

Thus

NOTE: As shown in Fig. b , MO acts perpendicular to the plane that contains F, rA, and rB . Had

this problem been worked using MO = Fd, notice the difficulty that would arise in obtaining the moment arm

16.Two forces act on the rod shown in Fig. a . Determine the resultant moment they create about the flange at O . Express the result as a Cartesian vector.

solution

Position vectors are directed from point O to each force as shown in Fig. b . These vectors are

solution i

The moment arm d in Fig. a can be found from trigonometry.

d = (3 m) sin 750 _{= 2.898 m} Thus,

MO = Fd = (5 kN)(2.898 m) = 14.5 kN. m

Since the force tends to rotate or orbit clockwise about point O , the moment is directed into the page.

solution ii

The x and y components of the force are indicated in Fig. b . Considering counterclockwise moments as positive, and applying the principle of moments, we have

+ MO = -Fxdy - Fydx

= -(5 cos 450_{KN)(3 sin 30}0_{m) - (5 sin 45}0 _{KN)(3 cos 30}0_{m)= -14.5 KN. m = 14.5 KN.m} solution iii

The x and y axes can be set parallel and perpendicular to the rod’s axis as shown in Fig. c . Here Fx produces no moment about point O since its line of action passes through this point.

Therefore, + MO = -Fy dx

= -(5 sin 750_{kN)(3 m) = -14.5 kN.m = 14.5 kN.m CW}

18.Force F acts at the end of the angle bracket in Fig a . Determine the moment of the force about point(p .m)

solution i (scalar analysis)

The force is resolved into its x and y components, Fig. b , then

+ MO = 400 sin 300_{N(0.2 m) - 400 cos 30}0 _{N(0.4 m) = -98.6 N.m = 98.6 N.m} or

F = {400 sin 300_{i - 400 cos 30}0 _{j} N = {200.0i - 346.4j} N} The moment is therefore

6.Replace the two forces and couple by a wrench. Find the moment M of the wrench and the coordinates of point P in the y-z plane through which the force of the wrench passes.

ANS.

R=SF = 200i +150j N

Assume positive wrench so the direction cosines of m are those of r or 0.8, 0.6,0 SMP =200(0.3 -Z)j -200(0.3-y)k +150 z i +150 (0.2)k -30i

=(-30 +150Z)i +(60-200Z)j + (-30+200y)k N.m Equate the direction cosines of SMP and SF

(-30+150z)/M=0.8 (60-200z)/M=0.6 (-30+200y)/M=0

Where M equals the magnitude of SMP Solving For y=0.15m or y=150mm z=0.264m or z=264mm

7.Determine and locate the resultant R of the two force and one couple acting on the I-beam.

You saw in the preceding lesson that the resultant of two forces may be determined either graphically or from the trigonometry of an oblique triangle.

A. When three or more forces are involved , the determination of their resultant R is best carried out by first resolving each force into rectangular components. Two cases may be encountered, depending upon the way in which each of the given forces is defined:

Case 1. The force F is defined by its magnitude F and the angle a it forms

with the x axis. The x and y components of the force can be obtained by multiplying

F by cos a and sin a, respectively [Example 1].

Case 2. The force F is defined by its magnitude F and the coordinates of two points A and B on its line of action ( Fig. 2.23 ). The angle a that F forms with the x axis may first be determined by trigonometry. However, the components of F may also be obtained directly from proportions among the various dimensions involved, without actually determining a [Example 2].

B. Rectangular components of the resultant. The components R x and R y of the resultant can be obtained by adding algebraically the corresponding components of the given forces [Sample Prob. 2.3].

You can express the resultant in vectorial form using the unit vectors i and j , which are directed along the x and y axes, respectively:

R 5 Rxi 1 Ryj

Alternatively, you can determine the magnitude and direction of the resultant by solving the right triangle of sides R x and R y for R and for the angle that R forms with the x axis.

ON YO

U89988999999999999999999999

99999R

10.Knowing that the tension in cable BC is 725 N, determine the resultant of the three forces exerted at point B of beam AB.

11.The forces F1, F2, and F3, all of which act on point A of the bracket, are specified in three different ways. Determine the x and y scalar components of each of the three forces.

couple

16.Replace the 10-kN force acting on the steel column by an equivalent force–couple system at point O. This replacement is frequently done in the design of