Elastic Behaviour of Materials

1. How Materials Compress and Stretch

• Solids hardly compress because neighbouring atoms are tightly linked.
• Liquids compress a little more; the atomic links are looser than in solids.
• Gases compress the most—about a million times more than solids—because molecules barely interact.

2. Worked Example – Water at Ocean Depth

At a depth of 3 000 m in the Indian Ocean, pressure squeezes water slightly.

Use the bulk modulus \(B = 2.2 \times 10^{9}\,\text{N m}^{-2}\)

The pressure from the water column is \(p = h\rho g = 3 \times 10^{7}\,\text{N m}^{-2}\).

The fractional volume change is

\[ \frac{\Delta V}{V} = \frac{\text{stress}}{B} = \frac{3 \times 10^{7}}{2.2 \times 10^{9}} = 1.36 \times 10^{-2}\;(\text{about }1.36\%). \]

3. Poisson’s Ratio \((\nu)\)

When you stretch a wire, it gets thinner sideways. The ratio of sideways (lateral) strain to length-wise (longitudinal) strain is

\[ \nu = \frac{(\Delta d / d)}{(\Delta L / L)} = \frac{\Delta d}{\Delta L}\frac{L}{d}. \]

• Typical steel: \(\nu \approx 0.28 – 0.30\).
• Aluminium alloys: \(\nu \approx 0.33\).

4. Energy Stored in a Stretched Wire

Pulling a wire stores elastic potential energy:

\[ u = \frac{1}{2}\sigma \varepsilon, \]

where \(u\) is energy per unit volume, \(\sigma\) is stress, and \(\varepsilon\) is strain.

5. Everyday Engineering Applications

5.1 Crane Ropes

To lift a 10-tonne load safely you choose a rope cross-section area

\[ A \ge \frac{W}{\sigma_y} = \frac{Mg}{\sigma_y}, \]

with yield strength \(\sigma_y \approx 300 \times 10^{6}\,\text{N m}^{-2}\) for mild steel. This gives \(A \approx 3.3 \times 10^{-4}\,\text{m}^2\) — roughly a 1 cm radius. Engineers add a safety factor (~10×), so real ropes use bundles of thinner wires adding up to about a 3 cm radius.

5.2 Beams in Bridges and Buildings

A beam of length \(l\), breadth \(b\), and depth \(d\) that carries a central load \(W\) sags by

\[ \delta = \frac{W l^{3}}{4 b d^{3} Y}. \]

• Choose a material with a high Young’s modulus \(Y\) (it bends less).
• Increasing depth d is far more effective than increasing breadth b.
• Deep, thin beams can buckle, so engineers use an I-section: lots of depth for stiffness, little weight in the middle.

5.3 Pillars and Columns

Pillars carry heavier loads when their ends spread the force over a wider area instead of meeting the ground in a sharp curve. Distributed ends reduce stress concentrations and the risk of failure.

5.4 Why Mountains Aren’t Taller than ~10 km

Rocks flow when shearing stress exceeds about \(30 \times 10^{7}\,\text{N m}^{-2}\). Setting \(h\rho g = 30 \times 10^{7}\) with rock density \(\rho = 3 \times 10^{3}\,\text{kg m}^{-3}\) gives

\[ h \approx 10\,\text{km}, \]

close to the height of Mount Everest.

6. Quick-Reference Equations

• Bulk compression: \(\displaystyle \frac{\Delta V}{V} = \frac{\text{stress}}{B}\)
• Poisson’s ratio: \(\displaystyle \nu = \frac{(\Delta d / d)}{(\Delta L / L)}\)
• Energy density in a wire: \(\displaystyle u = \frac{1}{2}\sigma \varepsilon\)
• Minimum rope area: \(\displaystyle A \ge \dfrac{Mg}{\sigma_y}\)
• Beam sag: \(\displaystyle \delta = \dfrac{W l^{3}}{4 b d^{3} Y}\)

7. High-Yield Ideas for NEET

1. The energy density formula \(u = \tfrac{1}{2}\sigma \varepsilon\) connects stress, strain, and stored energy.
2. Poisson’s ratio (\(\nu\)) values and its definition often appear in conceptual questions.
3. Minimum cross-section area \(A \ge Mg/\sigma_y\) for safe crane ropes tests practical use of yield strength.
4. Beam sag equation \(\delta = W l^{3} / (4 b d^{3} Y)\) highlights how depth controls bending.
5. Bulk compression relation \(\Delta V / V = \text{stress} / B\) is a shortcut for quick percentage change problems.

Keep practising these relationships — they pop up everywhere from solving exam questions to understanding real-world structures!