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The 40th number in the sequence will be 40 x 4, or 160.
Reasoning:
Because the sequence is multiples of 4.
The 1st number in the sequence is 1 x 4, or 4.
The 2nd number in the sequence is 2 x 4, or 8
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The 4th number in the sequence is 4 x 4, or 16
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The 17th number in the sequence is 17 x 4, or 68
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What is the 40th term of 0 6 16 30 48 .....?
According to Wittgenstein's Finite Rule Paradox every finite sequence of numbers can be a described in infinitely many ways and so can be continued any of these ways - some simple, some complicated but all equally valid. Conversely, it is possible to find a rule such that any number of your choice can be the 40th one.Using one of these infinitely many solutions, the answer is T(40) = 3198.
What is the next number in the sequence 16 21 26 26 12 5?
My guess: 2.5
16 is 12 percent of what number?
Divide it by 16 to find out what 1% is, then multiply by 100. 12/16 = 0.75 0.75 * 100 = 75 12 is 16% of 75.
How do you add one positive and one negative number and how do you know if the sum is positive or negative or zero example?
This is a fairly simple question. Say you had -12+16. You can simply find the difference between 16 and 12. Since the absolute of 16 is 16 and the absolute of -12 is 12, and 16 is bigger than 12, you can just subtract. -12+16=4 because 16-12=4. =] Good luck! XD
Find the least common denominator for fractions with denominators 9 12 16?
The least common denominator of 9, 12, and 16 is 144.
What is the next number in the sequence 12 16 21 27?
It is: 34
What is the next number in the numerical sequence 3 4 6 8 12?
It would be 16. The sequence is doubling pairs. 3 and 4 go on to be 6 and 8. 6 and 8 would go on to be 12 and 16. 12 and 16 would go on to be 24 and 32, and so on.
What comes next in this sequence 1 3 2 6 4 12 8 24?
. 16
Find the 19th term of the arithmetic sequence -4, -1 1/3, 1 1/3, 4?
The 19th term of the sequence is 16.
What is the next number in this sequence 46 42 14 28 24 48 16?
A single number, such as 4642142824816 does not constitute a sequence.
What is the 40th term of 0 6 16 30 48 .....?
According to Wittgenstein's Finite Rule Paradox every finite sequence of numbers can be a described in infinitely many ways and so can be continued any of these ways - some simple, some complicated but all equally valid. Conversely, it is possible to find a rule such that any number of your choice can be the 40th one.Using one of these infinitely many solutions, the answer is T(40) = 3198.
Find the next 2 terms of the Fibonacci sequence 2.2.4.6?
They are: 10 and 16
What number comes next in sequence 72 36 40 20 24 12?
16
What is the next number in the sequence 16 21 26 26 12 5?
My guess: 2.5
Find the LCM of 16 and 12?
LCM(16, 12) = 48.
What is the missing number in the following sequence 4 2 6 4 8 10..12?
16
What is the nth term of the following arithmetic sequence 12 16 20 24 28?
8 + 4n
