366363 A metallic ball and a spring are made of the same material and have the same mass. They are heated so that they melt, the latent heat required

366364 An ice cube of mass \(0.1Kg\) at \(0^\circ C\) is placed in an isolated container which is at \(227^\circ C\). The specific heat \(c\) of the container varies with temperature \(T\) according to the empirical relation \(c=A+B T\), where \(A = 100\,cal/Kg - K\) and \(B = 2 \times {10^{ - 2}}cal/Kg - {K^2}\). If the final temperature of the container is \(27^\circ C\), find the mass of the container. (Latent heat of fusion for water \( = 8 \times {10^4}cal/Kg\) specific heat of water \(\left. { = {{10}^3}cal/Kg - K} \right)\).

366365 A piece of ice at \(0^\circ C\) is dropped into water at \(0^\circ C\). Then ice will

366366 Steam at \(100^\circ C\) is passed into \(20\;g\) of water at \(10^\circ C\). When water acquires a temperature of \(80^\circ C\), the mass of water present will be [Take specific heat of water \( = 1\,cal\,{g^{ - 1}}\,^\circ {C^{ - 1}}\) and latent heat of steam \( = 540\,cal\,{g^{ - 1}}\) ]

366363 A metallic ball and a spring are made of the same material and have the same mass. They are heated so that they melt, the latent heat required

366364 An ice cube of mass \(0.1Kg\) at \(0^\circ C\) is placed in an isolated container which is at \(227^\circ C\). The specific heat \(c\) of the container varies with temperature \(T\) according to the empirical relation \(c=A+B T\), where \(A = 100\,cal/Kg - K\) and \(B = 2 \times {10^{ - 2}}cal/Kg - {K^2}\). If the final temperature of the container is \(27^\circ C\), find the mass of the container. (Latent heat of fusion for water \( = 8 \times {10^4}cal/Kg\) specific heat of water \(\left. { = {{10}^3}cal/Kg - K} \right)\).

366365 A piece of ice at \(0^\circ C\) is dropped into water at \(0^\circ C\). Then ice will

366366 Steam at \(100^\circ C\) is passed into \(20\;g\) of water at \(10^\circ C\). When water acquires a temperature of \(80^\circ C\), the mass of water present will be [Take specific heat of water \( = 1\,cal\,{g^{ - 1}}\,^\circ {C^{ - 1}}\) and latent heat of steam \( = 540\,cal\,{g^{ - 1}}\) ]

366363 A metallic ball and a spring are made of the same material and have the same mass. They are heated so that they melt, the latent heat required

366364 An ice cube of mass \(0.1Kg\) at \(0^\circ C\) is placed in an isolated container which is at \(227^\circ C\). The specific heat \(c\) of the container varies with temperature \(T\) according to the empirical relation \(c=A+B T\), where \(A = 100\,cal/Kg - K\) and \(B = 2 \times {10^{ - 2}}cal/Kg - {K^2}\). If the final temperature of the container is \(27^\circ C\), find the mass of the container. (Latent heat of fusion for water \( = 8 \times {10^4}cal/Kg\) specific heat of water \(\left. { = {{10}^3}cal/Kg - K} \right)\).

366365 A piece of ice at \(0^\circ C\) is dropped into water at \(0^\circ C\). Then ice will

366366 Steam at \(100^\circ C\) is passed into \(20\;g\) of water at \(10^\circ C\). When water acquires a temperature of \(80^\circ C\), the mass of water present will be [Take specific heat of water \( = 1\,cal\,{g^{ - 1}}\,^\circ {C^{ - 1}}\) and latent heat of steam \( = 540\,cal\,{g^{ - 1}}\) ]

366363 A metallic ball and a spring are made of the same material and have the same mass. They are heated so that they melt, the latent heat required

366364 An ice cube of mass \(0.1Kg\) at \(0^\circ C\) is placed in an isolated container which is at \(227^\circ C\). The specific heat \(c\) of the container varies with temperature \(T\) according to the empirical relation \(c=A+B T\), where \(A = 100\,cal/Kg - K\) and \(B = 2 \times {10^{ - 2}}cal/Kg - {K^2}\). If the final temperature of the container is \(27^\circ C\), find the mass of the container. (Latent heat of fusion for water \( = 8 \times {10^4}cal/Kg\) specific heat of water \(\left. { = {{10}^3}cal/Kg - K} \right)\).

366365 A piece of ice at \(0^\circ C\) is dropped into water at \(0^\circ C\). Then ice will

366366 Steam at \(100^\circ C\) is passed into \(20\;g\) of water at \(10^\circ C\). When water acquires a temperature of \(80^\circ C\), the mass of water present will be [Take specific heat of water \( = 1\,cal\,{g^{ - 1}}\,^\circ {C^{ - 1}}\) and latent heat of steam \( = 540\,cal\,{g^{ - 1}}\) ]