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The domain of u(x) is the set of all real values except 0 and the domain of v(x) is the set of all real values except 2. What are

the restrictions on the domain of (u )(x)?

(x) 0 and v(x) 2

OXO and x cannot be any value for which u(x) = 2

x 2 and x cannot be any value for which v(x) - 0

u(x) 2 and v(x) 0

Respuesta :

akiran007

Answer:

For u(x), x ≠ 0 and for  v(x)  x≠ 2.

Step-by-step explanation:

The domain of U(x) is restricted to zero. It means it cannot have a value equal to zero. At zero it cannot be defined.

Suppose we have the function

U(x) = 1/ x and if we put the value of x= 0 then 1 cannot be divided by zero and it is undefined.

Similarly the function of V(x) is restricted to a value of 2. It is such a function that if we put a value equal to 2 then it will be undefined.

victoriav17

Answer:

u(x)≠0 and v(x)≠2

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