The Basics
Simplify: (32)(33)(34)
39
(3ab3)2/(6a2b-3)
3b9/2
The length of the segment connecting (2,-2) and (-3,-1) is
square root of 26
(5x2y3)2(4x7y4)
400x11y10
Lines AB and CD intersect at E. If <AEC=2x+40, <CEB=x+20, find x.
40
The product of (2a-3)(8a2)
16/a
(22x5)3/(25x58)
2/55
In Triangle ABC, <C is a right angle. The slope of AC is 2/3. the slope of BC is
-3/2
(-83b2/12a2b3)-3
- 27b3/8a3
(225)3/2558
2/55
The expression (10w3)2/5w is equivalent to
20w5
Simplify: (-a)3(-a2)(-a)4(a)
a10
The coordinates of triangle ABC are, A(0,0), B(6,0), C(0,4). What are the coordinates of the point at which the median from vertex A intersects BC?
(3,2)
(-4x2/3y)3 /(5x2/-6y)2
-256x2/75y
[(r3)-2(s2)4]/r0(s-3)-2
s2/r6
(a3b-3c14)0
1
3(x2y3)2/(-2x3y)2
3y4/4x2
Line AB is represented by the equation: y-7=3/2x.
Line CD is represented by the equation: 2y+14=3x.
The relationship between the lines is
parallel
{[(2x3)]-2}x-2
1/26x20
(-4x2y-3)2(-2x-3y4)-3
-2x13/y18
The value of 20+2-1+2-2 is
7/4
(3x)(3x)(3x)=
33x
The measure of the vertex angle in an isosceles triangle is 70. The measure of a base angle
55
(-2a-2b3)3/(16a2b-3)2
If the measure of the angles of a triangle are represented by x+30, 4x+30, 10x-30, the triangle is
isosceles