Ok, the rest are 30, 42, 36, 16, 120, 60, 100, 16, 210, 75, 42, 105?, 36, 16, 120, 30, 42, 60, 75, 42, 106, 180?, 16, and 210.
Picture is cut off from bottom.
The numbers that are shaded?
24, 12, 20, 13, 15, 12, 18, 13, 12, 10, 20?
This is a weird layout of a chart!
Is it supposed to be like 2*3 = 6
6*6 = 36
and so on?
or everything is 2*x?
Like 2*3, 2*6, etc.
You can try factoring out as much but other than that, there is not much to do.
1/16 = 0.0625
2/16 = 1/8 = 0.125
Like this?
Just type in 3*10^5, for example, to use scientific notation.
We can find the coordinates of N by using the midpoint formula, the coordinates of L and the midpoint, M.
(-3 + x)/2 = 0
(-1 + y)/2 = 1
-3 + x = 0
x = 3
-1 + y = 2
y = 2 + 1 = 3.
N --> (3,3).
The denominator can be placed in the numerator as long as you take away the negative from -2:
So, you end up with: (ab^2)(a^2b)^2...
Now, you just have to simplify:
(ab^2)(a^2^2)(b^2)
a*b^2*a^4*b^2
a*a^4*b^2*b^2
Remember, add exponents for similar bases:
a^5*b^4.
a. Since you're turning over the edge each side --> 2*5/8 = 10/8 in.
10/8 in. + 5 3/4 in. = ? in.
b. Based on the number you found in part a. --> ?^2 * 48 = # square in.
c. How many full squares can you make with ? in. dimensions given the restriction of 36 in. wide? That'll be the number of squares you can fit per row. Now, take that number of full squares and see how many rows you would need to have 48 squares.
d. How many squares are left over. Let s = # of squares left over. So, s(?^2) will be your answer.
