If you have a $1 bill, a $5 bill, $10 bill, and a $20 bill, how many different sums of money can you make using one or more of these bills?
If you have a $1 bill, a $5 bill, $10 bill, and a $20 bill, how many different sums of money can you make using one or more of these bills?
Two cell divisons per day implies that the number of cell divisions in ( T ) days is 2*T cell divisons. This means that the equation we can use is C(T) = 10*22*T for T days. How many days...
if David invest $1000 in an account paying an annual percentage rate of 12% compunded quaterly, how much would he have in your account at the end of 1 year, 10 year and 100 year?
1) <A=48 , b=24, c=18 2) a=24, b=28, c=35
1) c = 26 , <B = 49 , <c = 53 2) <A = 56 , b = 12 , a = 11 3) <A= 94 , <C = 22 , b=5 4) <C = 58, a = 12, b = 16 5) <B = 68 , b = 14, c = 18
find the exact values of the 6 trig function for a) 240 degree and b) 13π/4
find the exact value of cot(9π/2) and sin(-5π) ???
find using law of sines < = Angles <A=32 <C=57 c = 27 a = ???
< = angles determine how many solution exist <A = 84 , a = 25 , b=15 Solutions ---- < B = __ <C = ___ c=__ <B= __ <C=__ c=__
< = angles determine how many solution exist <A = 65 , a = 10 , b=20 Solutions ---- < B = __ <C = ___ c=__ <B= __ <C=__ c=__
use the law of cosines to find angle measure. a = 9 b = 10 c = 11 Find the measure of Angle(A) ?
use an angle sum identity to calculate the exact value of tan(75).
use the law of cosines to find the side of each triangle. round the answer to nearest tenth. angle(A ) = 58 degree side (b) = 9 side (c) =12 find side (a) ?
write Cos^2(x/2) - Sin(2x) in terms of Sin(x) and Cos(X) . ((hint use a double angle and half angle identity ))
find all solutions for Sin^2x - 2sinx - 3 = 0 on the interval [0 , 2pi )
prove that 1 - Cos^2x = Cos^2x Tan^2x
Prove that Sin^2x + Cos^2x + 1 = 2Cos^2x + 2Sin^2x
Ms.Jeffrey takes off from her boat in key west harbor and averages 40 knots traveling 3hours on course of 65 degree. he then travel for 4hours at same speed on a course of 153 degree. what is...
Erick sights the top of building and finds the angle of elevation to be 35 degree. He moves 100 feet closer and finds that the angle is now 40 degree. what is the height of the building?
from a 75ft observation tower a controller sights a hot air ballon at an angle of elevation of 20 degree. if horizontal distance from the tower is 300 feet . what is the elevation of the ballon?...