Question
For each function, evaluate (a) $g(0,0,0)$; (b) $g(1,0,0) ;$ (c) $g(0,1,0) ;$ (d) $g(z, x, y)$; (e) $g(x+h, y+k, z+l)$, provided such a value exists.$$g(x, y, z)=\ln (x+y+z)$$
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For each function, evaluate (a) $g(0,0,0)$; (b) $g(1,0,0) ;$ (c) $g(0,1,0) ;$ (d) $g(z, x, y)$; (e) $g(x+h, y+k, z+l)$, provided such a value exists. $$ g(x, y, z)=e^{x+y+z} $$
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For each function, evaluate (a) $g(0,0,0)$; (b) $g(1,0,0) ;$ (c) $g(0,1,0) ;$ (d) $g(z, x, y)$; (e) $g(x+h, y+k, z+l)$, provided such a value exists. $$ g(x, y, z)=\frac{e^{x y z}}{x+y+z} $$
For each function, evaluate (a) $g(0,0,0)$; (b) $g(1,0,0) ;$ (c) $g(0,1,0) ;$ (d) $g(z, x, y)$; (e) $g(x+h, y+k, z+l)$, provided such a value exists. $$ g(x, y, z)=\frac{x y z}{x^{2}+y^{2}+z^{2}} $$
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