There are two consecutive even integers that equal -298: -150 and -148.
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
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.
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?
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.
19,966,000
289,000,000,000. 9 zeros
298
percentage = (167/298)% or 0.5604%% rate:= 167000000/2080000000000 * 100%= (167/298)% or 0.5604%
Two hundred and ninety-eight.
It is: 2.98*1011
29.8*107 = 298,000,000 or 298 million.
Eight million two hundred [and] ninety eight thousand nine hundred [and] twenty three.Eight million two hundred [and] ninety eight thousand nine hundred [and] twenty three.Eight million two hundred [and] ninety eight thousand nine hundred [and] twenty three.Eight million two hundred [and] ninety eight thousand nine hundred [and] twenty three.
149/500
Note that 298 can be written as 298.0. Move 2 decimal places to the left and we write the term as: 2.98 x 102
His personal fortune was estimated in 2010 at $298 million (US dollars)
The factors of 298 are: 1, 2, 149, 298