A steel girder AB, of mass 200 kg and length 12 m, rests horizontally in equilibrium on two smooth supports at C and D, where AC = 2 m and DB = 2 m. A man of mass 80 kg stands on the girder at the point P, where AP = 4 m, as shown in Figure 1. The man is modelled as a particle and the girder is modelled as a uniform rod. (a) Find the magnitude of the reaction on the girder at the support at C. The support at D is now moved to the point X on the girder, where XB = x metres. The man remains on the girder at P, as shown in Figure 2. Given that the magnitudes of the reactions at the two supports are now equal and that the girder again rests horizontally in equilibrium, find (b) the magnitude of the reaction at the support at X, (c) the value of x.

A-Level Edexcel Maths Mechanics Forces: A steel girder AB, of mass 200 k

A steel girder AB, of mass 200 kg and length 12 m, rests horizontally in equilibrium on two smooth supports at C and D, where AC = 2 m and DB = 2 m - Edexcel - A-Level Maths Mechanics - Question 2 - 2013 - Paper 1

Question 2

A-steel-girder-AB,-of-mass-200-kg-and-length-12-m,-rests-horizontally-in-equilibrium-on-two-smooth-supports-at-C-and-D,-where-AC-=-2-m-and-DB-=-2-m-Edexcel-A-Level Maths Mechanics-Question 2-2013-Paper 1.png

A steel girder AB, of mass 200 kg and length 12 m, rests horizontally in equilibrium on two smooth supports at C and D, where AC = 2 m and DB = 2 m. A man of mass 80... show full transcript

Worked Solution & Example Answer:A steel girder AB, of mass 200 kg and length 12 m, rests horizontally in equilibrium on two smooth supports at C and D, where AC = 2 m and DB = 2 m - Edexcel - A-Level Maths Mechanics - Question 2 - 2013 - Paper 1

Step 1

(a) Find the magnitude of the reaction on the girder at the support at C.

96%

114 rated

Answer

To find the reaction at support C, we can use the principle of moments about point D.

Let the reaction at C be represented by R.

The total moment about point D can be calculated as:

$M(D) = (80 ext{ kg} imes 6 ext{ m}) + (200 ext{ kg} imes 4 ext{ m})$

Calculating this gives:

$M(D) = 480 + 800 = 1280 ext{ kg m}$

At equilibrium, the moments due to the reactions must balance the total moment.

Thus:

$R imes 2 = 1280$

From this, we solve for R:

$R = \frac{1280}{2} = 640 ext{ N}$

Step 2

(b) the magnitude of the reaction at the support at X,

99%

104 rated

Answer

In the new configuration, since the reactions at C and X are equal, we denote the reaction at X as the same as R. The total load on the girder now includes the man and the girder's weight:

Therefore:

$2R = 80 ext{ kg} + 200 ext{ kg}$

This simplifies to:

$2R = 280 ext{ kg}$

Thus, the magnitude of the reaction R at X is:

$R = \frac{280}{2} = 140 ext{ N}$

Step 3

(c) the value of x.

96%

101 rated

Answer

Setting the sum of moments about point B results in the following:

The moments about B can be expressed as:

$M(B) = (80 ext{ kg} imes 8 ext{ m}) + (200 ext{ kg} imes 6 ext{ m})$

This gives:

$140 + (R imes 10) = (80 imes 8 ext{ m}) + (200 imes 6 ext{ m})$

Substituting the known values, we can write:

$140 + 1400 = 640 + 1200$

This simplifies down to determine x:

$140 + 1400 - 640 - 1200 = 0$

Thus, calculating for x yields:

$x = 2 ext{ m}$ .

A steel girder AB, of mass 200 kg and length 12 m, rests horizontally in equilibrium on two smooth supports at C and D, where AC = 2 m and DB = 2 m - Edexcel - A-Level Maths Mechanics - Question 2 - 2013 - Paper 1

Worked Solution & Example Answer:A steel girder AB, of mass 200 kg and length 12 m, rests horizontally in equilibrium on two smooth supports at C and D, where AC = 2 m and DB = 2 m - Edexcel - A-Level Maths Mechanics - Question 2 - 2013 - Paper 1

(a) Find the magnitude of the reaction on the girder at the support at C.

(b) the magnitude of the reaction at the support at X,

(c) the value of x.

Join the A-Level students using SimpleStudy...