Which inequality represents all the values of x for which the product below is defined?

x[tex] \sqrt{x} -4
\sqrt{x} +1[/tex]

A: x≥-1
B: x≥4
C:x≤4
D:x≥0

Question

08-02-2014
Mathematics

Answered

Which inequality represents all the values of x for which the product below is defined?

x[tex] \sqrt{x} -4
\sqrt{x} +1[/tex]

A: x≥-1
B: x≥4
C:x≤4
D:x≥0

Answer :

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isyllus isyllus · Answer 1 · 2019-03-04T07:37:45-05:00

isyllus isyllus

04-03-2019

Answer:

x≥0 is correct inequality.

D is correct.

Step-by-step explanation:

We are given a function [tex]f(x)=x\sqrt{x}-4\sqrt{x}+1[/tex]

We need to find x where function is defined.

As we know negative inside the root not defined.

Inside the root value must be greater than equal to 0.

Here we have inside the root is x.

Therefore, x must be greater than equal to 0.

Inequality: x≥0

Please see attached graph for more clarification.

Hence, x≥0 is correct inequality.

Answer Link

jpor612 jpor612 · Answer 2 · 2021-06-15T14:16:49-04:00

jpor612 jpor612

15-06-2021

Answer:

x is greater than or equal to 4 (x>_4)

Step-by-step explanation: a p e x

Answer Link

Which inequality represents all the values of x for which the product below is defined?x[tex] \sqrt{x} -4 \sqrt{x} +1[/tex]A: x≥-1B: x≥4C:x≤4D:x≥0

Answer :

Other Questions

Which inequality represents all the values of x for which the product below is defined?

x[tex] \sqrt{x} -4
\sqrt{x} +1[/tex]

A: x≥-1
B: x≥4
C:x≤4
D:x≥0