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2.98 million or 2,980,000 = (2 x 106) + (9 x 105) + (8 x 104) + (0 x 103) + (0 x 102) + (0 x 101) + (0 x 100)

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Q: How do you write 2.98 million in expanded form?
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What are 2 consecutive integers that equal -298?

There are two consecutive even integers that equal -298: -150 and -148.


Next number in series 298 209 129 58 -4?

298 less 209 is 89 209 less 129 is 80 129 less 58 is 71 58 less -4 is 62 The result of each subsequent equation is 9 less than the previous one (89, 80, 71...). The next result is going to be 62-9=53. The first number in each equation above is the same as the second number in the previous equation: 298 less 209 is 89 209 less 129 is 80So, the next equation will be: -4 less X is 53 Therefore, X is the next number in the original sequence, which resolves to: -57


How do you count by 6's?

6,12, 18, 24, 30, 36,42,48, 54, 60, 66, 72, 78, 84, 90, 96, 102, 108, 114, 120, 126, 132, 138, 144, 150, 156, 162, 178, 184, 190, 196, 202, 208, 214, 220, 226, 232, 238, 244, 250, 256, 262, 268, 274, 280, 286, 292, 298 etc.


Next in series 298 209 129 58 -4?

Oh, dude, you're throwing some numbers at me like we're playing math dodgeball. So, like, to find the pattern, it's like taking a stroll through a number garden. If you squint real hard, you'll see that we're just subtracting decreasing numbers each time. So, the next number is probably going to be like -4 minus something, but who's really keeping track, right?


What is next number is series 298 209 129 58 - 4?

The answer can be any number that you like: it is always possible to find a polynomial of order 5 to fit the given numbers and any other number.The lowest degree polynomial that will fit the given numbers is the quadraticUn = (9n2 - 205n + 792)/2 for n = 1, 2, 3, .. . and that gives the next number as -57.The answer can be any number that you like: it is always possible to find a polynomial of order 5 to fit the given numbers and any other number.The lowest degree polynomial that will fit the given numbers is the quadraticUn = (9n2 - 205n + 792)/2 for n = 1, 2, 3, .. . and that gives the next number as -57.The answer can be any number that you like: it is always possible to find a polynomial of order 5 to fit the given numbers and any other number.The lowest degree polynomial that will fit the given numbers is the quadraticUn = (9n2 - 205n + 792)/2 for n = 1, 2, 3, .. . and that gives the next number as -57.The answer can be any number that you like: it is always possible to find a polynomial of order 5 to fit the given numbers and any other number.The lowest degree polynomial that will fit the given numbers is the quadraticUn = (9n2 - 205n + 792)/2 for n = 1, 2, 3, .. . and that gives the next number as -57.