Simplify the following algebraic expression: -6wx+8wx-12wx -10wx 14wx Cannot be simplified -26wx 2wx
Simplify (-4k^4+14+3k^2)+(-3k^4-14k^2-8) Write answer in standard form. square
Original Equation: (1)/(6)(-12x^2)+4=-x^2-2 First Step: -2x^2+4=-x^2-2 Answer commutative property of addition associative property of multiplication associative property of addition commutative property of multiplication
Evaluate the following expression. 3c+5b when b=5 and c=15 3c+5b= square (Simplify your answer.)
Find the distance between the points (-20,8) and (-16,-8) Also find the midpoint of the line segment joining the two points. The distance is square (Type an exact answer.using radicals as needed.) The midpoint is square (Type an ordered pair.)
Solve the formula for c. d=(n)/(c-v) C= square
Divide the polynomials. The form of your answer should either be p(x)orp(x)+(k)/(x-2) where p(x) is a polynomial and kis an integer. (x^3+6x^2-5x)/(x-2)=square
Divide. (8827)/(13) The remainder is zero. (8827)/(13)=square The remainder is greater than zero. (8827)/(13)=square Rsquare
The coordinate 6 has a weight of 1 the coordinate 8 has a weight of 3, and the coordinate 10 has a weight of 1. Find the weighted average. Weighted average: square
Solve for y. vert 4y-10vert =-2 If there is more than one solution, separate them with commas. If there is no solution, click on "No solution". y= square
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 $
