Math  /  Algebra

QuestionDetermine whether the equation defines yy as a function of xx. (See Example 9.) 3x+y=03|x|+y=0 is a function is not a function

Studdy Solution

STEP 1

1. A function is defined as a relation where each input (in this case, each x x ) has exactly one output (y y ).
2. We need to determine if for every x x , there is a unique y y that satisfies the equation.

STEP 2

1. Isolate y y in the equation.
2. Analyze the expression for y y to determine if it is unique for each x x .
3. Conclude whether y y is a function of x x .

STEP 3

Start with the given equation:
3x+y=0 3|x| + y = 0
Isolate y y by subtracting 3x 3|x| from both sides:
y=3x y = -3|x|

STEP 4

Analyze the expression y=3x y = -3|x| .
The absolute value function x |x| is unique for each x x , meaning for each x x , there is exactly one value of x |x| .
Since y y is expressed as 3 -3 times the absolute value of x x , for each x x , there is exactly one corresponding y y .

STEP 5

Conclude whether y y is a function of x x .
Since for each x x , there is exactly one y y , the equation y=3x y = -3|x| defines y y as a function of x x .
The equation defines y y as a function of x x .
The equation is a function.

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