[size=150]Which equation can be represented by a graph with a vertex at [math]\left(1,3\right)[/math]?[/size]
[size=150]Where is the vertex of the graph that represents [math]y=\left(x-2\right)^2-8[/math]?[/size][br]
[size=150][size=100]Where is the [math]y[/math]-intercept? Explain how you know.[br][/size][/size]
Identify one other point on the graph of the equation. Explain or show how you know.[br]
[size=150]The function [math]v[/math] is defined by [math]v(x)=\frac{1}{2}(x+5)^2-7[/math].[br][br][/size]Without graphing, determine if the vertex of the graph representing [math]v[/math] shows the minimum or maximum value of the function. Explain how you know.
[size=150]Describe what would happen to the graph if the original equation was changed to:[br][/size][br][math]y=\frac{1}{2}x^2[/math] [br]
Graph the equation [math]y=\frac{1}{2}x^2-8[/math] on the same coordinate plane as [math]y=x^2[/math].[br]
The graph shows the rock's height above the water, in feet, as a function of time in seconds.[br][img]data:image/png;base64,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[/img][br]Select [b]all[/b] the statements that describe this situation.[br]
[list][*]The height, in feet, of Object A is given by the equation [math]f(t)=4+32t-16t^2[/math].[br][/*][*]The height, in feet, of the Object B is given by the equation [math]g(t)=2.5+40t-16t^2[/math]. In both functions, [math]t[/math] is seconds after launch.[/*][/list]
What is the maximum height of each object?
Which object hits the ground first? Explain how you know.[br]
[size=150]Andre thinks the vertex of the graph of the equation [math]y=(x+2)^2-3[/math] is [math](2,-3)[/math]. Lin thinks the vertex is [math](-2,3)[/math].[/size][br] Do you agree with either of them?
[size=150]The expression [math]2000\cdot(1.015^{12})^5[/math] represents the balance, in dollars, in a savings account.[/size][br][br]What is the rate of interest paid on the account?[br]
How many years has the account been accruing interest?[br]
How much money was invested?[br]
How much money is in the account now?[br]
Write an equivalent expression to represent the balance in the savings account.[br]