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Q: How do you write 4500300 in expanded form using exponets?

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To write a number in expanded form, you first need to divide it by a power of ten such that the greatest place value is units. In this case we can divide by 100 to give 8.26. The next step is to write that power of 10 alongside as a multiplication. 100 is the second power of 10 or 102. Thus 826 in expanded form is 8.26x102

1,000 = (1 x 10^4) + (0 x 10^3) + (0 x 10^2) + (0 x 10^1) + (0 x 10^0)

41,006 = (4 x 104) + (1 x 103) + (0 x 102) + (0 x 101) + (6 x 100)

127,803 = (1 x 105) + (2 x 104) + (7 x 103) + (8 x 102) + (0 x 101) + (3 x 100)

8 X 101

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2^4

9614 = (9 x 10^3) + (6 x 10^2) + (1 x 10^1) + (4 x 10^0)

To write a number in expanded form, you first need to divide it by a power of ten such that the greatest place value is units. In this case we can divide by 100 to give 8.26. The next step is to write that power of 10 alongside as a multiplication. 100 is the second power of 10 or 102. Thus 826 in expanded form is 8.26x102

245 / 549 / 77The answer is 51 * 72

7 x 10^4 + 4 x 10^3 + 2 x 10^2 + 7 x 10^1 + 1 x 10^0

1,000 = (1 x 10^4) + (0 x 10^3) + (0 x 10^2) + (0 x 10^1) + (0 x 10^0)

This way!648

ask your teacher because neither of my parents can figure it out im in fifth gradeto me its not possible Why did you answer that if you don't know the answer?! That's idiotic.I'm in 5th grade And I know the answer! An example is: 52,965= (5x104)+(2x103)+(9x102)+(6x101)+(5x100)

41,006 = (4 x 104) + (1 x 103) + (0 x 102) + (0 x 101) + (6 x 100)

jguiy

505,584 = (5 x 105) + (0 x 104) + (5 x 103) + (5 x 102) + (8 x 101) + (4 x 100)

127,803 = (1 x 105) + (2 x 104) + (7 x 103) + (8 x 102) + (0 x 101) + (3 x 100)