Solve for g. 3(g-14)=15 g= square
Solve for k. 2.37=(k-3.16)/(2) k= square
Use the order of operations to simplify the expression. 2^2-32+4^2cdot 6-7 2^2-32+4^2cdot 6-7=61
Find the product. Express your answer as a decimal. 17.15times 1.62=square
Sean has 75 to spend on CDs. If each CD costs 6.98 , about how many CDs can he buy? 10 13 12 7
52. Express the following in exponential (scientific) notation: (a) 8,000,000 (b) 0.000075 (c) 23,600 ,000,000 (d) 37,000 (e) 6492 (f) 0.000000028
Using a number line what is the approximate value of sqrt (39) ? (1 point) 6.6 6.4 6.2 6.8
2. 5 square What is the frequency for the third class (E) square What is the frequency for the first class (A) square . I What is the total of the relative frequencies (H)' 7 square What is the relative frequency for the third class (F) square What is the tolal of all frequencles (G) . square I What is the relative recuency for the second class (D) square . What is the rolative frequency for the first class (B) 1 1. 7 3. 8 4. 20 5. 0.35 6. 0.25 7. 0.40 8. 1
Anika constructed ray AC that bisected angle A If the mangle BAD is 46 degrees, what is the mangle BAC (1 point) The mangle BAC is 23 degrees The mangle BAC is 92 degrees. The mangle BAC=mangle DAC The mangle BAC is 46 degrees
Use the fact that 361 is a perfect square to evaluate sqrt (361) sqrt (361)=sqrt ((pm square )^2)
7. A fair six-sided die is rolled. What are the odds of getting a 3 or higher. Leave your answer as a reduced fraction. $\square $
Find $(2(cos\frac {2\pi }{3}+isin\frac {2\pi }{3}))^{5}$ $-16-16i\sqrt {3}$ $16+16i\sqrt {3}$ $16\sqrt {3}+16i$ $-16\sqrt {3}-16i$
Convert into a complex number: $2(cos\frac {4\pi }{3}+isin\frac {4\pi }{3})$ $-\sqrt {3}-i$ $\sqrt {3}-i$ $-1-i\sqrt {3}$ $1+i\sqrt {3}$
Convert into a polar coordinate: $2\sqrt {3}-2i$ $(4,\frac {7\pi }{6})$ $(-4,\frac {11\pi }{6})$ $(-4,\frac {5\pi }{6})$ $(4,\frac {\pi }{6})$
10. Simplify the expression. $\sqrt {125t^{4}r^{3}s^{13}}$
1. What is the simplified form of $-\sqrt {(y+5)^{16}}$ A. $(y+5)^{8}$ B. $-(y+5)^{8}$ C. $(y+5)^{4}$ D. $-(y+5)^{4}$
Which quadrilateral does not have diagonals that are perpendicular? Rectangle Rhombus Square
Simplify the following expression completely. $\frac {x^{2}-14x+45}{x^{2}-18x+81}$
What is the measure of an exterior angle in a regular 15-gon? Write your answer as an integer or as a decimal rounded to the nearest tenth.
Find the distance between the given points. $(-3,1)$ and $(12,37)$ $\square $
