34 Using the quadratic formula, solve x^2-6x+3=0 Express the answer in simplest radical form.
Use the Associative Property to rewrite the expression 3x+(x+2) by combining like terms. (1 point) square
12. A(6,-8), B(6,1), C(7,-2), D(-2,-2) D-19 ARE A B 2 C D congruers
(d) irrational numbers -8.5 o (7)/(2) sqrt (2) 2.71 -pi 3.1overline (4) 100 -8
Simplify the radical below. sqrt [4](648) square
Choose the correct vocabulary word or property that matches the definition or rule given. A. a^mcdot a^n=a^m+n square v B. (ab)^n=a^nb^n square C. (a^m)^n=a^mn square D. (a^m)/(a^n)=a^m-n square E. ((a)/(b))^m=(a^m)/(b^m),bneq 0 square F. a^-m=(1)/(a^m) [Select] [Select] square
Use long division to divide the polynomial (24x^4-24x^3-18x^2) by (4x^3+2x^2) Write your answer in standard form. (1 point)
Simplify. 8^-7cdot 8^5 Enter the correct numbers in the boxes to simplify the expression. 8^-7cdot 8^5 =(square )/(square )
Simplify. 4i(-6+8i) Enter your answer in the box in standard form. square
Perform the following operations for the given decimals. 0.27+0.5=square 0.27-0.5=square 0.27times 0.5=square
5 Cheddar cheese costs $\$ 4.25$ per pound. Which equation best represents y, the total cost of x pounds of cheddar cheese? Your answer
Simplify. $\frac {\frac {9}{2}-6}{1+\frac {7}{6}}$ $\square $
Find the partial sum. $\{ 38,31,24,17,\ldots \} ;S_{12}$
7. Find the coordinates of the intersection of the diagonals of the parallelogram with vertices $(-2,-4),(-4,4),(2,12)$ and $(4,4)$ 8. Three vertices of $\square ABCD$ are $A(1,5),B(1,1)$ and $D(2,2)$ Find the coordinates of the remaining vertex.
The GCF of $40c^{6}$ and $48c^{7}$ is $8c$ The missing exponent is __ The solution is $\square $
Find the solution(s) to each equation, or explain why there is no solution. $\sqrt {x+4}+7=5$
28. \( \left(\frac{112}{7}\right)^{\frac{1}{4}} \)
use the distributive property to remove the parentheses. $(2z^{4}-8z^{3}+3)4z^{5}$ Simplify your answer as much as possible.
$Area=4\cdot 69$ $=\square \cdot (\square -\square )$
$2x+y=41$ $x=y-39$ $y=2x-41$ $y=-2x+41$ $x=2y+41$
