Which statement would least likely be used to describe variation? Variations are inherited differences between individuals of the same species. Variations that decrease reproductive success are more likely to be passed on. Variations may result in changes to an entire population after many generations. Variations provide some individuals with an advantage.

7. $2\frac {1}{3}\times \frac {9}{10}\times 1\frac {1}{5}=$

13. $0.4\% =0.4\div 100$ $=\frac {0.4}{\square }=\frac {4}{\square }$ = $\square $

Find $f'(x)$ $f(x)=(2-4x)^{15}$ $f'(x)=$ $\square $

Evaluate. Write your answers as fractions. $\frac {2^{3}}{3}=$ $\square $ $-(\frac {1}{4})^{2}=$ $\square $

4. A person who is 5 feet tall casts a shadow that is 7 feet long. At the same time a nearby tree casts a shadow that is 21 feet long. How tall is the tree?

Factor by grouping to obtain the difference of two squares. $9x^{2}-30x+25-36y^{2}$ $9x^{2}-30x+25-36y^{2}=\square $ (Factor completely.)

The length of a rectangular parking lot at the airport is $\frac {2}{3}$ mile. If the area is $\frac {1}{2}$ square mile, what is the width of the parking lot? A. $\frac {1}{3}mile$ B. $\frac {3}{4}mile$ C. $1\frac {1}{6}mile$ D. $1\frac {1}{3}mile$

Find the derivative. $y=xcoth(2+x^{2})$ $y'(x)=$ $\square $

Which expression is a factor of $4x^{2}-25x-21$ 7 $x-3$ $x-7$ $x-2$ $x-6$

What is the midpoint of $(-2,0)$ and $(8,0)$ A. $(0,0)$ B. $(1,0)$ C. $(3,0)$ D. $(4,0)$