Solution of \(p\sqrt x + q\sqrt y = \sqrt z \) is

1.	Solution of \(p\sqrt x + q\sqrt y = \sqrt z \) is
A.	\(\sqrt x + \sqrt y = f\left( {\sqrt x - \sqrt z } \right)\)
B.	\(\sqrt x - \sqrt y = f\left( {\sqrt x - \sqrt z } \right)\)
C.	\(\sqrt x - \sqrt y = f\left( {\sqrt x + \sqrt z } \right)\)
D.	\(\sqrt x + \sqrt y = f\left( {\sqrt x + \sqrt z } \right)\)
Answer» C. \(\sqrt x - \sqrt y = f\left( {\sqrt x + \sqrt z } \right)\)

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