The following observations were taken for determining surface tension $$T$$ of water by capillary method:
Diameter of capillary, $$D = 1.25 \times {10^{ - 2}}m$$
Rise of water, $$h = 1.45 \times {10^{ - 2}}m$$
Using $$g = 9.80\,m/{s^2}$$   and the simplified relation $$T = \frac{{rgh}}{2} \times {10^3}N/m,$$     the possible error in surface tension is closest to-

Solution :
Surface tension, $$T = \frac{{rhg}}{2} \times {10^3}$$
Relative error in surface tension, $$\frac{{\Delta T}}{T} = \frac{{\Delta r}}{r} + \frac{{\Delta h}}{h} + 0$$     ($$\because $$ g, 2 and $${10^3}$$ are constant)
Percentage error
$$\eqalign{ & 100 \times \frac{{\Delta T}}{T} = \left( {\frac{{{{10}^{ - 2}} \times 0.01}}{{1.25 \times {{10}^{ - 2}}}} + \frac{{{{10}^{ - 2}} \times 0.01}}{{1.45 \times {{10}^{ - 2}}}}} \right)100 \cr & = \left( {0.8 + 0.689} \right) \cr & = \left( {1.489} \right) \cr & = 1.489\% \cong 1.5\% \cr} $$