[img]data:image/png;base64,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[/img][br][size=150]Decide whether the following statements are true or false:[br][/size][br]The graph has multiple x-intercepts.[br]
A horizontal intercept of the graph represents the time when Andre was with his bike.[br]
A minimum of the graph is [math]\left(17,1\right)[/math].
The graph has two maximums.
About 21 seconds after he left his bike, he was the farthest away from it, at about 8.3 feet.[br]
[table][tr][td][math]f\left(x\right)=4x-5[/math] [/td][td] [math]g\left(x\right)=4\left(x-5\right)[/math] [/td][td] [math]h\left(x\right)=\frac{x}{4}-5[/math][br][/td][/tr][/table] Which of these function values is the largest?
[size=150]Function [math]f[/math] is defined by the equation [math]f\left(x\right)=x^2[/math].[br][/size][br]What is [math]f\left(2\right)[/math]?
What is [math]f\left(3\right)[/math]?
Explain why [math]f\left(2\right)+f\left(3\right)\ne f\left(5\right)[/math].