Question: If the functions f and g are continuous for all real x, is f + g always continuous for all real x? Yes No If

If the functions f and g are continuous for all real x, is f + g always continuous for all real x? Yes No If the functions f and g are continuous for all real x, is . always continuous for all real x? Yes No If f + g is not continuous, give an example to verify your conclusion. Of+ g is continuous. Of( x) - x, 9(x) - x2 - 1 Of(x) - x2 - 1, 9(x) = 1 Of( x ) - x2 + 1, 9 ( x ) = 1 Of(x) - x, 9(x ) = x2 + 1 If _ is not continuous, give an example to verify your conclusion. g - is continuous. Of(x) = x, g(x) = x2 - 1 Of ( x ) - x2 - 1, 9(x ) = 1 Of(x) - x2 + 1, 9 (x ) = 1 Of(x) = x, g(x) = x2 + 1

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