70
4 in each bag. 2*4 = 8 bags 8 bags of 4 marbles = 32 marbles
700 x 8 = 5600
it's the LCM of 18 and 42 18 = 2x32 42 = 2x3x7 LCM = 2x32x7 = 126
Find what is common so 19-3 = 16 and 16/2 = 8 therefor Ken has 8 marbles and Aziz has 8+3 =11 marbles
A:This doesn't seem like a math question. The obvious answer is to play the game of marbles with them. When I was a boy, this was a popular game for kids. The idea is that one marble is designated as the shooter . The other marbles are placed in a ring drawn in the dirt.You place the shooter in one hand and using your thumb, shoot it at one of the marbles in the ring , trying to knock it out of the ring. if you succeed, you get a point and another shot. If you " play for keeps" each players puts a certain number of his marbles in the ring and you get to keep the marbles you knock out.There is common board game called Chinese checkers that uses marbles for men. The board has holes in it to hold the marbles.A:As far as marbles and math go, a bag containing various colored marbles is often used to demonstrate probable outcomes. For example, if a bag contains 3 blue marbles, 3 red marbles, and 1 yellow marble, what is the probability that the first two marbles pulled will be of different colors?(In this example, the odds are 5 out of 7, or about 71%. If either a red or blue marble is pulled first, which will each happen 3/7 of the time, there would be four out of six marbles left whose color doesn't match. If the yellow marble is pulled, which will happen 1/7 of the time, the next marble is guaranteed to not match.)
That would depend on how many yellow and blue marbles are in a pack. If yellow and blue marbles are sold separately and there are the same number of marbles in a pack, buy one of each. That's probably not the case.
6
4 in each bag. 2*4 = 8 bags 8 bags of 4 marbles = 32 marbles
The marbles are now in a ratio of 4:1 between them. Ben has 72 marbles Bill has 18 marbles
If each of three people was supposed to have the same amount of marbles, and there were nine total marbles, it is a division problem: 9/3=3 marbles each. You really need to offer more information.
56 marbles
At the simplest level, one would analyze the color of each marble, creating two piles of marbles (one red and one blue). If the person was not able to see colors, they might consider using a spectrometer (spectrograph). Measuring each marble individually, each marble would be placed in the device and the wavelength would be displayed by the device. Based on the wavelength (red is in the range of 620-750nm and blue is in the range of 450-475nm), the person would still create two piles of marbles, the higher wavelength one (indicating red) and the lower wavelength one (indicating blue).
700 bags if each bag contains 8 marbles is a total of 5600 marbles.
You could solve by repetitive subtraction, or division. 45/8 = 5, with remainder of 5.So 5 boys can each have 8 marbles, which is 40 marbles, and there will be 5 marbles remaining.
The theoretical probability of randomly picking each color marble is the number of color marbles you have for each color, divided by the total number of marbles. For example, the probability of selecting a red marble is 3/20.
a bag contains 150 marbles some of the marbles are blue and the rest of the marbles are white in the bag there are 21 blue marbles for every 4 white marbles how many of each color marble blue and white are in the bag show or explain your thinking
56 marbles (TOTAL)