The diagram in the figure shows a uniform metre rule weighing 100 gf, pivoted at its centre O. Two weights 150 gf and 250 gf hang from the points A and B of the metre rule such that OA = 40 cm and OB = 20 cm. Calculate:
(i) the total anticlockwise moment about O,
(ii) the total clockwise moment about O,
(iii) the difference of anticlockwise and clockwise moments,
and (iv) the distance from O where a 100 gf weight should be placed to balance the metre rule.
The diagram in the figure shows a uniform metre rule weighing 100 gf, pivoted at its centre O. Two weights 150 gf and 250 gf hang from the points A and B of the metre rule such that OA = 40 cm and OB = 20 cm. Calculate:
(i) the total anticlockwise moment about O,
(ii) the total clockwise moment about O,
(iii) the difference of anticlockwise and clockwise moments,
and (iv) the distance from O where a 100 gf weight should be placed to balance the metre rule.
(i) Total anticlockwise moment about O = 150 gf × 40 cm = 6000 gf cm
(ii) Total clockwise moment about O = 250 gf × 20 cm = 5000 gf cm
(iii) Difference = 6000 gf cm - 5000 gf cm = 1000 gf cm
(iv) Let the 100 gf be placed at a distance x to the right of point O (to balance the extra anticlockwise moment). From the principle of moments,
150 × 40 = 250 × 20 + 100 × x
⇒ 1000 = 100 x
⇒ x = 10 cm
(i) Total anticlockwise moment about O = 150 gf × 40 cm = 6000 gf cm
(ii) Total clockwise moment about O = 250 gf × 20 cm = 5000 gf cm
(iii) Difference = 6000 gf cm - 5000 gf cm = 1000 gf cm
(iv) Let the 100 gf be placed at a distance x to the right of point O (to balance the extra anticlockwise moment). From the principle of moments,
150 × 40 = 250 × 20 + 100 × x
⇒ 1000 = 100 x
⇒ x = 10 cm
