If the weights retained on the 2.36 mm, 1.18 mm, 600 $\mu m$, and 300 $\mu m$ sieves are 30%, 35%, 15%, and 20%, respectively, of the total weight of an aggregate sample, then the fineness modulus of the sample is ........... (rounded off to 2 decimal places).

Question

A steel beam supported by three parallel pin-jointed steel rods is shown in the figure. The moment of inertia of the beam is $ 8 \times 10^7 \, {mm}^4 $. Take modulus of elasticity of steel as 210 GPa. The beam is subjected to uniformly distributed load of 6.25 kN/m, including its self-weight. The axial force (in kN) in the centre rod CD is ......... (round off to one decimal place).
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Answer 1

The fineness modulus (FM) of an aggregate sample is calculated by summing the cumulative percentage weight retained on the sieves and dividing by 100. The formula is: \[ {Fineness modulus} = \frac{\sum {percentage cumulative weight retained}}{100}. \] We are given the cumulative percentages for each sieve size as follows:
- 2.36 mm: 30%
- 1.18 mm: 30% + 35% = 65%
- 600 $\mu m$: 65% + 15% = 80%
- 300 $\mu m$: 80% + 20% = 100%
Thus, the fineness modulus is:
\[ FM = \frac{30 + 65 + 80 + 100}{100} = 3.75. \] Therefore, the fineness modulus of the sample is 3.75, which corresponds to option (A).

Air Pollutants		Treatment techniques
P	NO₂	i	Flaring
Q	SO₂	ii	Cyclonic separator
R	CO	iii	Lime scrubbing
S	Particles	iv	NH₃ injection

If the weights retained on the 2.36 mm, 1.18 mm, 600 $\mu m$, and 300 $\mu m$ sieves are 30%, 35%, 15%, and 20%, respectively, of the total weight of an aggregate sample, then the fineness modulus of the sample is ........... (rounded off to 2 decimal places).

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Correct Answer: 3.74

Solution and Explanation

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