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Q: What is the range of the linear equation if y equals 3x-5 and the Domain equals 0 1 2 or 3?

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The domain and range are both [-6, +6].

The domain is related to the range depending on the equation or equations given. Without this context, the domain for a Cartegian plane (2 dimensions) is simply R, or all real numbers. With a linear equation (absolute value/ dependent variation) a more useful and specific answer can be given.

domain is set of real numbers range is set of real numbers

The domain and range of the equation y = 2x+8 are both [-infinity,+infinity].

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If the domain is the set of real numbers, so is the range.

The answer depends on the domain for x. For example, if the domain is x = 7, then the range is 55. If the domain is all Real numbers, then the range is y >= 6.

The range is the y, while the domain is the x.

This is the equation of a line with slope -4 and y intercept at 0. The domain is all real numbers as is the range.

Domain is the independent variable in an equation. It is what you put "in" the equation to get the Range.

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Y = x squared -4x plus 3 is an equation of a function. It is neither called a domain nor a range.

Which equation can have the following domain and range? {x | 8 ≤ x ≤ 14} {y | 29 ≤ y ≤ 53}Answer this question…

domain: all real numbers range: {5}

domain: (-infinity to infinity) range: ( -infinity to infinity)

The domain would be (...-2,-1,0,1,2...); the range: (12)

The function is a simple linear function and so its nature does not limit the domain or range in any way. So the domain and range can be the whole of the real numbers. If the domain is a proper subset of that then the range must be defined accordingly. Similarly, if the range is known then the appropriate domain needs to be defined.

The Domain and Range are both the set of real numbers.

It depends on the domain but, if the domain is the real numbers, so is the range.

What is the domain and range of absolute lxl - 5

-2

The range depends on the domain.

The range depends on the domain, which is not specified.

It is a bijection [one-to-one and onto].

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