Solve for s. (s)/(4)-1=1.5 s= square
How many conductors are required for a building with a perimeter of 365 feet? 7 3 4 5
Simplify the expression: 2(4+3r)= square
Q(8.8,0.8) and R(15.5,16.2) are the endpoints of a line segment. What is the midpoint M of that line segment? (8) Write the coordinates as decimals or integers. M=(square ,square )
Evaluate the line integral, where C is the given plane curve. int _(C)xy^2ds C is the right half of the circle x^2+y^2=16 2=16 oriented counterclockwise
Multiply. (-(5)/(12))((1)/(8))(-(6)/(7))(-(1)/(7))
Ladder rungs should be spaced between __ and __ inches apart. 2.4 4ldots 6 6ldots 10 10ldots 14
9. The set of ordered pairs (b,M) where b is the number of bags of mandarins on a shelf.and M is the number of mandarins . Each bag holds 12 mandarins . and the shelf can hold at most 20 bags.
Evaluate the following limit. lim _(xarrow infty )(-4x^3-3x^2-4x+8)/(-3x^2)-x+2 square
2x^2+11x+5 18x^2-18x+4 4x^3-20x^2+9x-45
Part 7:Statistics 19. Find the mean (average) of the following numbers: $72,80,88,90,70$ Answer: __
18. A number cube $(1-6)$ is rolled. What is the probability of rolling an even number? Answer: __
Factor the polynomial below. $36x^{2}-25$ Cannot be factored $(6x+5)(5x-6)$ $(6x-5)^{2}$ $(6x+5)(6x-5)$
$3x(6x^{2}-4xy^{2})+8x^{2}y^{2}-2y^{3}$
15. A rectangle has a length of 14 m and a width of 9 m. What is the perimeter? Answer: __
The sum of three consecutive numbers is 309 . What is the smallest of the three numbers?
Identify the focus of each. 31) $y-6=(x-4)^{2}$ 32) $\frac {1}{2}(x+2)=(y+9)^{2}$ 33) $x^{2}+4x+4y+4=0$ 34) $2x^{2}-24x+y+70=0$
Which is the product $(3x-5)(3x+5)$ in general form? $9x^{2}+25$ $9x^{2}-25$ $9x^{2}+15x-25$ $9x^{2}-15x-25$
Find the value of the expression $(t^{3}\div 4+s)\div 7$ for $s=19$ and $t=2$ $\square $
How would you write this expression using the values for a and b? $9(18)\div 10$ $9+18\div 10$ $10(18)\div 9$ $10+18\div 9$
