Simplify using the properties of exponents. (2a^5b^7)^9
The coordinates of the endpoints of FG are F(-7,-6) and G(1,2) . Point H is on FG and divides it such that FH:GH is 3:1 . What are the coordinates of H?
Factor to find all x-intercepts of the function. f(x)=x^4+x^2
Solve 7.1div 10^2 (1) 7.1div 10^2= square
Solve 3.4times 10^3 3.4times 10^3= square
Find the product. (2x+3)(x+5) 3x^2+x+8 10x+15 2x^2+13x+5 2x^2+3x
Is the Inverse of g(x) a function? Uso the drop-down menus to oxplain. g(x)=x^2-2 Click the arrows to choose an answer from each monu. The graph of the inverse of g(x) is the reflection of the graph of g(x) across the square .The inverse of g(x) square a function because for each input of the inverse of g(x) there is square . one unique output.
Simplify the expression. (3^-2)/(3^-4) Enter your answer in the box. square
8. Which of the following expressions is equivalent to the given expression? 3^0cdot 7^6cdot 7^-4 A 7cdot 7 B 3cdot 7^2 C 7^10 D 147^2
15) 5x^2+15x-140 16) 10n^2+11n-8
Find the perimeter of the triangle with these vertices. $(4,3),(-3,3),(-3,-3)$ Give an exact answer (not a decimal approximation). Simplify your answer as much as possible.
) Select all the factor pairs of 28. 4 and 6 2 and 14 3 and 7 1 and 28 4 and 7 3 and 9
8) $\frac {2\sqrt [5]{5p^{2}}}{\sqrt [5]{16p}}$
Solve. $6x^{\wedge }4-7x^{\wedge }2+2=0$
8. Which of these below correctly solves for yof the equation $3x-2=4y+5$ $y=-3x-5$ $y=-\frac {3}{4}x+\frac {7}{4}$ $y=\frac {3}{4}x-\frac {7}{4}$ $y=3x+5$
2. What value of x makes this equation true? $6-x=5x+30$
4)) Find the number that makes the ratio equivalent to $2:11$ $\square :88$
5) Solve the equation below for III. $-8=\frac {m+7}{-4}$
Solve the equation a $0=x^{3}-4x^{2}-21x$ b $2x^{4}-6x^{3}=12x^{2}-36x$
\( 3 x + 2 \longdiv { 9 x ^ { 3 } + 2 7 x ^ { 2 } + 1 7 x + 2 } \)
