40 J/g is the heat of vaporization of the liquid.
Answer: Option D
Explanation:
Given that mass of liquid sample: m = 10 g
And, Specific heat of the liquid: S = 2 J/g K
Also, the increase in the temperature of the liquid, [tex]\Delta T = T_{2}-T_{1} = 10 K[/tex]
Therefore, the total amount of heat energy required is given by:
[tex]q_{1} = m \times S \times\left(T_{2}-T_{1}\right) = 10 \times 2 \times 10 = 200 J[/tex]
According to the given data in the question,
Total heat energy supplied, q = 400 J
Rest of heat would be [tex]q_{2}=q-q_{1}=400-200=200 \mathrm{J}[/tex]
Now, 200 J vaporizes the mass, half of the liquid from full portion boiled away. So,
[tex]m^{\prime} = \frac{10}{2} = 5 \mathrm{g}[/tex]
Latent heat of vaporization of the liquid is [tex]L_{v}[/tex]. It can be calculated as below,
[tex]q_{2} = m^{\prime} L_{v}[/tex]
[tex]L_{v} = \frac{q_{2}}{m^{\prime}} = \frac{200}{5} = 40 \mathrm{J} / \mathrm{g}[/tex]
