Please make this question more specific, I really don't understand what your are trying to ask.
if there are ten rows with three buttons each, then there are 30 buttons!
Incorrect: 1 half-dollar, 1 quarter, 2 dimes, 1 nickel, and 4 pennies. Correct: If half dollars are not allowed, 3 quarters, 2 dimes, 4 pennies. 9 coins If they are, 1 half-dollar, 1 quarter, 2 dimes, 4 pennies. 8 coins ---- Fixed by the staff at www.joeswebs.com, making your dream website come alive for the lowest price, guaranteed.
3.5 * 4 = 14
9 3/4
The statement is correct. "What" has 4 letters. "Sometimes" has 9 letters. "Never" has 5 letters.
oooo arrange them in a triangle shape, four coins each side. o o oo o
Yes it is possible!O.........O.........O.....O....O....OO.........O.........OFind the 10 Rows - trust me they are there!(The dots are only there as place markers)
You can have: 1 row of 36 2 rows of 18 3 rows of 12 4 rows of 9 or 6 rows of 6, so in total there are 5 ways.
It's a concrete way to visualize an abstract concept. If you can arrange the chairs (or blocks or stones or any other items) in even rows, those dimensions are factors. You will find you will be able to arrange them in 2 rows of 9 and 3 rows of 6. You will not be able to arrange them in rows of 4 or 5 without having some left over. The factors of 18 are 1, 2, 3, 6, 9 and 18.
wait not the discription srry
a square of 3 by 3, if you can have rows which go side to side and up to down x x x 1 x x x 2 x x x 3 4 5 6 technically the last three would be columns, but it's a trick question really.
2 rows of 18 squares3 rows of 12 squares4 rows of 9 squares6 rows of 6 squares9 rows of 4 squares12 rows of 3 squares18 rows of 2 squares36 rows of 1 squareI would not count "1 row of 36 squares", because you only have a single row that cannot equal another row (there is only one rowafter all). If this is for homework, I would state your reasoning for excluding (or including) that set. Count all the options up, and you have 8 different ways you can arrange the rows with the exclusion.
19 plants in 9 row
Sorry ... my initial answer was a bit ugly. Bringing in the third-dimension was cute, but lazy. Here is a 2-D solution: 1...2...3 ..4.5.6.. 7...8...9 The ten rows are: 1. 123 2. 148 3. 159 4. 247 5. 258 6. 269 7. 357 8. 368 9. 456 10. 789
3 1 1 1 1 1 1 The drawing above, if it is preserved by the formatting, illustrates how. For the first row, put on 4 coins in a row. Stack two additional coins on top of one of the coins. For the second row, make it perpendicular to the first row, and overlapping the stack of 3 coins. You have used a total of 9 coins, with the stack of 3 coins doing double duty for both rows.
18 Chairs into equal rows - 6 x 3 2 x 9 18 x 1
OO XO OOOO XOX O Ignore the X's - I just used them for 'padding'