Let the roots of the given equation be {tex}\\alpha {/tex}\xa0and {tex}\\beta{/tex}.Then, {tex}\\alpha {/tex}\xa0+ {tex}\\beta{/tex}\xa0= {tex}{{ – q} \\over p}{/tex} and {tex}\\alpha .\\beta = {q \\over p}{/tex}Given: {tex}{\\alpha \\over \\beta } = {a \\over b}{/tex}Now, {tex}\\sqrt {{a \\over b}} + \\sqrt {{b \\over a}} + \\sqrt {{q \\over p}} = 0{/tex}=> {tex}\\sqrt {{\\alpha \\over \\beta }} + \\sqrt {{\\beta \\over \\alpha }} + \\sqrt {\\alpha \\beta } = 0{/tex} [Since, {tex}{\\alpha \\over \\beta } = {a \\over b}{/tex}\xa0and {tex}\\alpha .\\beta = {q \\over p}{/tex}]=> {tex}{{\\sqrt \\alpha } \\over {\\sqrt \\beta }} + {{\\sqrt \\beta } \\over {\\sqrt \\alpha }} + \\sqrt {\\alpha \\beta } = 0{/tex}=> {tex}{{\\alpha + \\beta + \\alpha \\beta } \\over {\\sqrt {\\alpha \\beta } }} = 0{/tex}=> {tex}\\alpha + \\beta + \\alpha \\beta = 0{/tex}=> {tex}{{ – q} \\over p} + {q \\over p} = 0{/tex} [Since, {tex}\\alpha + \\beta = {{ – q} \\over p}{/tex}\xa0and {tex}\\alpha \\beta = {q \\over p}{/tex}]=> {tex}-q+q=0{/tex}=> 0 = 0Hence proved.