The symmetry with respect to both axes and the origin for the equation, y = − 3 x + 7 . Also sketch the graph of the equation. The equation, y = − 3 x + 7 , is not symmetric about the x -axis, the y -axis, and the origin. Explanation: Consider the equation, y = − 3 x + 7 . To check for symmetry about y -axis, replace x with − x in the original equation, and simplify the equation. If the equation after simplifying is equivalent to the original equation, then the given equation will be symmetric about y -axis. Replace x with − x in the original equation as, y = − 3 − x + 7 = 3 x + 7 Since the new equation is not equivalent to the original equation, the given equation is not symmetric about y -axis. To check for symmetry about x -axis, replace y with − y in the original equation, and simplify the equation. If the equation after simplifying is equivalent to the original equation, then the given equation will be symmetric about x -axis. Replace y with − y in the original equation − y = − 3 x + 7 y = 3 x − 7 Since the new equation is not equivalent to the original equation, the given equation is not symmetric about x -axis. To check for symmetry about the origin, replace x with − x , and y with − y in the original equation, and simplify the equation. If the equation after simplifying is equivalent to the original equation, then the given equation will be symmetric about the origin. Replace x with − x and y with − y in the original equation as, − y = − 3 − x + 7 − y = 3 x + 7 y = − 3 x − 7 Since the new equation is not equivalent to the original equation, the given equation is not symmetric about the origin. Plot the graph of the equation, y = − 3 x + 7 , by using the table below which consists of the different values of y for the different values of x . y = − 3 x + 7 16 13 7 1 − 5 x − 3 − 2 0 2 4 Now plot the points,

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Chapter 1, Problem 5RE

To determine

The symmetry with respect to both axes and the origin for the equation, y=−3x+7. Also sketch the graph of the equation.

The equation, y=−3x+7, is not symmetric about the x -axis, the y -axis, and the origin.

Explanation:

Consider the equation,

y=−3x+7.

To check for symmetry about y -axis, replace x with −x in the original equation, and simplify the equation.

If the equation after simplifying is equivalent to the original equation, then the given equation will be symmetric about y -axis.

Replace x with −x in the original equation as,

y=−3−x+7=3x+7

Since the new equation is not equivalent to the original equation, the given equation is not symmetric about y -axis.

To check for symmetry about x -axis, replace y with −y in the original equation, and simplify the equation.

If the equation after simplifying is equivalent to the original equation, then the given equation will be symmetric about x -axis.

Replace y with −y in the original equation

−y=−3x+7y=3x−7

Since the new equation is not equivalent to the original equation, the given equation is not symmetric about x -axis.

To check for symmetry about the origin, replace x with −x, and y with−y in the original equation, and simplify the equation.

If the equation after simplifying is equivalent to the original equation, then the given equation will be symmetric about the origin.

Replace x with −x and y with−y in the original equation as,

−y=−3−x+7−y=3x+7y=−3x−7

Since the new equation is not equivalent to the original equation, the given equation is not symmetric about the origin.

Plot the graph of the equation, y=−3x+7, by using the table below which consists of the different values of y for the different values of x.

y =−3x+7161371−5x−3−2024

Now plot the points,

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