Question 7 of 10
1 answer:
The leading coefficient determines the shape of the graphs, such as how
the characteristic of a function are directed.
Correct response:
The graphs that represents functions that have a negative leading
coefficient are;
- Graph A, Graph B, and Graph C
Graph A:
The function in graph <em>A</em> is x³
When the coefficient of <em>x³</em> is negative, the value of the function rises as <em>x</em> decreases from 0 to -∞, and decreases as<em> x</em> increases from 0 to ∞
Therefore;
- <u>The </u><u>leading coefficient </u><u>of Graph </u><u><em>A</em></u><u> is negative</u>.
Graph B:
The value of the graph decreases as the magnitude of <em>x</em> increases
therefore, the graph is similar to a quadratic function, such that the leading
coefficient is negative, which inverts the function to give increasing output
with negative value as the value of <em>x</em> increases.
Therefore;
- The <u>leading coefficient of the quadratic function in Graph B is negative</u>.
Graph C:
The given function in graph <em>C </em>is a linear function having a negative slope,
therefore;
- <u>The leading coefficient of </u><u><em>x</em></u><u> in the function in Graph C is negative</u>.
Graph D:
The function of the graph in Graph D, that have <em>y</em> values that increases
exponentially as <em>x</em> increases is a quadratic function.
Given that <em>y</em> increases as the value of <em>x</em> increases, the leading coefficient
(coefficient of x²) is positive.
Therefore;
- The graphs that represents functions that have negative leading coefficient are; Graph A, Graph B, and Graph C.
Learn more about the factors that depend on leading coefficient of a function here:
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