Solve for x. (2)/(3)x-(5)/(6)=(1)/(4)x x= square
Write the function that results from shifting y=sqrt (x) to the right 8 and up 7. y=sqrt (x+8)+7 y=sqrt (x-8)+7 y=sqrt (x-8)-7 y=sqrt (x-7)+8
If fis the function defined by f(x)=(x-9)/(sqrt (x)-3) then lim _(xarrow 9)f(x) is equivalent to which of the following? A lim _(xarrow 9)(sqrt (x)-3) B lim _(xarrow 9)(sqrt (x)+3) C lim _(xarrow 9)((x^2-81)/(x-9)) D (lim _(xarrow 9)(x-9))/(lim _(xarrow 9)(sqrt (x)-3))
Solve each equation or formula for the specified variable. 13. c=(2d+1)/(3) for d
9. Solve the following equation by factoring. 4y^2=12y
Simplify the radical expression. sqrt (75x^3) square
Which number should be added to both sides of this quadratic equation to complete the square? ((-3)/(2))^2+1=x^2-3x+((-3)/(2))^2 Enter the value that belongs in both of these green boxes. ([?])/([ ])+1=x^2-3x+([?])/([ ])
Point Q is on line segment overline (PR) Given QR=3x,PQ=x+6 and PR=5x-4 determine the numerical length of overline (PQ) Answer Attempt1out of 2 PQ=square
Find the distance between (4,-8) and (4,2) The distance is square units.
Find the sum of 2.35times 10^19 and 3.157times 10^17 2.38157times 10^36 3.1805times 10^36 2.38157times 10^19 3.1805times 10^19
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 $
