Exam 7: Quadratic Equations, Functions and Inequalities

The city of Morgana is 20 miles due west of Vining. Beckett is due north of Morgana. If the distance from Beckett to Vining is 2 miles less than 3 times the distance from Beckett to Morgana, How far apart are Beckett and Morgana? Round to 1 decimal place.

Solve the inequality. $- x ^ { 2 } - 18 x - 81 < 0$

a. Find the vertex. b. Find the y-intercept. c. Find the x-intercept(s), if they exist. d. Use this information to graph the function. $f ( x ) = - x ^ { 2 } + 7 x - \frac { 49 } { 4 }$

The staging platform for a fireworks display is 8 ft above ground, and the mortars leave the platform at 160 ft/sec. The height of the mortars h(t) (in feet) can be modeled by $h ( t ) = - 16 ( t - 5 ) ^ { 2 } + 408$ where t is the time in seconds after launch. a. If the fuses are set for 5 sec after launch, at what height will the fireworks explode? b. Will the fireworks explode at their maximum height? Explain

Solve for $a . ( a > 0 )$ $a ^ { 2 } + b ^ { 2 } + c ^ { 2 } = d ^ { 2 }$

The daily profit made by an automobile manufacturer is $P ( x ) = - 45 x ^ { 2 } + 2,250 x - 18,000$ where x is the number of cars produced per shift. How many cars must be produced per shift for the company to break even?

Solve the rational inequality. Write the answer in interval notation. $\frac { ( x + 7 ) ^ { 2 } } { x } > 0$

Solve the equation. $\frac { 3 z } { z - 3 } + \frac { 3 } { z - 8 } = 1$

Solve the rational inequality. Write the answer in interval notation. $\frac { 4 g + 4 } { 4 g - 12 } < 0$

Solve the equation by using substitution. $z ^ { 2 / 3 } + 3 z ^ { 1 / 3 } - 10 = 0$

The temperature at an Ohio state park for one day in June can be approximated by the function $T ( x ) = 0.284 x ^ { 2 } - 5.11 x + 82 \quad 0 \leq x \leq 18$ where T is degrees Fahrenheit and x is the number of hours after 5 PM on Friday. T(x) has no x-intercepts. Explain why this makes sense in the context of the problem.

Write the coordinates of the vertex and determine if the vertex is a maximum point or a minimum point. Then write the maximum or minimum value. $k ( x ) = \frac { 1 } { 4 } ( x + 3 ) ^ { 2 }$

Solve the equation by using the quadratic formula. $- \frac { 4 } { 3 } = \frac { 1 } { 6 } x - 5 x ^ { 2 }$

Write the function in the form $f ( x ) = a ( x - h ) ^ { 2 } + k$ by completing the square. $f ( x ) = x ^ { 2 } + 20 x - 6$

Find the x-intercepts of the function. $h ( x ) = 16 x ^ { 2 } - 64 x + 64$

Solve the polynomial inequality. Write the answer in interval notation. $u ^ { 2 } - 12 u \leq - 32$

Write the coordinates of the vertex and determine if the vertex is a maximum point or a minimum point. Then write the maximum or minimum value. $n ( x ) = - 5 x ^ { 2 } + \frac { 23 } { 3 }$

Find the vertex of $g ( x ) = \frac { 1 } { 3 } \left( x + \frac { 24 } { 5 } \right) ^ { 2 } - \frac { 5 } { 24 }$ .

Graph the function. $f ( x ) = x ^ { 2 } - \frac { 3 } { 2 }$

Solve the equation by using substitution. $t - 3 \sqrt { t } = - 2$