The graph of the linear function is parallel to the abscissa axis and passes through the point
June 22, 2021 | education
| The graph of the linear function is parallel to the abscissa axis and passes through the point M (2; -3). Specify this function with a formula.
A linear function is a function of the form y = kx + b, the graph of which is a straight line defined on the entire number line. k – coefficient of inclination of the straight line to the OX axis. Since a function is given that is parallel to the abscissa axis, this slope coefficient is k = 0. Hence, this function will have the form y = b, where b = -3, since the point M (2; -3) belongs to the graph of this function.
Answer: y = -3.
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