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## How do you find the integral of sqrt x 2 1?

The domain of the function will thus be **(u2212u221e,u22121]u222a[1,+u221e) . The range of the function will be determined by the fact that the square root of a real number must always be positive. The smallest value the function can take will happen for xu22121 and for x1 , since those values of x will make the radical term equal to zero.**

## What is the domain of sqrt x 2 1?

The domain of the function will thus be **(−∞,−1]∪[1,+∞)** . The range of the function will be determined by the fact that the square root of a real number must always be positive. The smallest value the function can take will happen for x=−1 and for x=1 , since those values of x will make the radical term equal to zero.

## Is X 1/2 the same as the square root of x?

The reason this is true is that fractional exponents are defined that way. For example, x12 means the square root of x , and x13 means the cube root of x . In general, x1n means the n th root of x , written nu221ax . Therefore, **x12u221ax .**

## How do you find the integral of a square root function?

The integral of square root x can be found using the formula of **integration u222bxn dx xn+1/(n + 1) + C. In this formula, we can substitute n 1/2 as root x can be written as u221ax x**1/2.

## What is the domain of √ X 2?

Set the radicand in u221ax+2 greater than or equal to 0 to find where the expression is defined. Subtract 2 from both sides of the inequality. The domain is all values **of x that make the expression defined. The range of a negative even indexed radical starts at its starting point (u22122,0) and extends to negative infinity.**

## What is the domain of √ X?

So the domain for u221ax is **xu22650 x u2265 0 .**

## What is the domain of √?

The domain of a square root function is **all values of x that result in a radicand that is equal to or greater than zero.**

## What is the domain of X square 1?

Algebra Examples The domain of the expression is **all real numbers except where the expression is undefined.**

## Why is X 1/2 the same as a square root?

The reason this is true is that **fractional exponents are defined that way. For example, x12 means the square root of x , and x13 means the cube root of x . In general, x1n means the n th root of x , written nu221ax . Therefore, x12u221ax .**

## Is the square root of x equal to X?

We can define the symbol u221ax to be the number that which when squared gives x back, e.g. (u221ax)2x. We would like to write u221ax in the form xa so that **(xa)2x**

## Is the square root of x the same as X squared?

The square root of x is written or **x. For example, since 3**2 9.

## What is the domain and range of √ X 2?

So, the Domain is the set of all non-negative reals, i.e., R+u222a{0}[0,**u221e). Also, u2200xu2208R+u222a{0},u221axu22650u21d2yu221axu22122u2265u22122. Hence, the Range is [u22122,u221e).**

## What is the domain and range of Y √ X 2 1?

So the domain for u221ax is **xu22650 x u2265 0 .**

## What is the domain of 1 √ X?

Set the radicand in u221ax greater than or equal to 0 to find where the expression is defined. The domain is **all values of x that make the expression defined. The range of a negative even indexed radical starts at its starting point (0,1) and extends to negative infinity.**

## What is the domain of square root of?

Assuming that we are working in real number domain, it is obvious x cannot take values less than one. Hence, domain is **xu22651 . However, as u221axu22121 , y can take any value. Hencr, range is all real numbers.**

## What is the domain and range of √ X 1?

u2234 Domain of y 1u221a|x|u2212x 1 | x | u2212 x is **x x26lt; 0 or ( u221e, 0).**