Solve for u. (5)/(4)u-(1)/(2)=-(4)/(3) Simplify your answer as s much as possible. u=- square
2. Express twenty-nine thousandths as a fraction.
Solve the equation for the variable y . 4y=-9x+11 y= square
Weighted Average: The coordinate -9 has a weight of (1)/(3) and the coordinate 27 has a weight of (2)/(3) Find the weighted average. square
Complete the following statement . Use the integers that are closest to the number in the middle. square lt -sqrt (102)lt square
Question Simplify completely,assuming both xgt 0 and ygt 0:sqrt (36x^3y^9) Provide your answer below:
(a) Find the midpoints for the classes. Class & Midpoint & Frequency 0.0-4.9 & square & 21 5.0-9.9 & square & 23 10.0-14.9 & square & 12 15.0-19.9 & square & 3 20.0-24.9 & square & 6 25.0-29.9 & square & 0 30.0-34.9 & square & 1 35.0-39.9 & square & 4 40.0-44.9 & square & 0 45.0-49.9 & square & 0 50.0-54.9 & square & 3
Factor the polynomial, if possible 2s^2+11s+15 Select the correct choice below and fill in any answer boxes within your choice. A. 2s^2+11s+15=square (Type your answer in factored form.) B. The polynomial is prime.
angle 1 and angle 2 form a llnear pair.If mangle 1=6x+1 and mangle 2=2x-5 . find the measures of both angles.
Example 2: Write the domain and range of the function in both inequality notation and interval notation. sqrt [3](2x-7)
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 $2x^{4}-6x^{3}=12x^{2}-36x$
\( 3 x + 2 \longdiv { 9 x ^ { 3 } + 2 7 x ^ { 2 } + 1 7 x + 2 } \)
