first step - write the number 1
second step - write an upside down 7 to the right of the 1
third step - write a regular 7 next to the upside down 7 (making a 0)
fourth step - repeat steps 2 and 3 to the right of steps 2 and 3
1 L7 L7 - best i can do with a keyboard
You said that 4(2s - 1) = 7s + 12Eliminate parentheses: 8s - 4 = 7s + 12Add 4 to each side: 8s = 7s + 16Subtract 7s from each side: s = 16
Use the following formula: an = a1 + (n - 1)d, where a1 = the first term n = the n th term (general term) d = common difference (which is constant between terms) Since we need to find the 14 th term, we can write: a1 = 100 n = 14 d = -4 an = a1 + (n - 1)d a14 = 100 + (14 - 1)(-4) a14 = 100 + (13)(-4) a14 = 100 - 52 a14 = 48 Thus, the 14 th term is 48.
4
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Bring all the unknown values to one side and the known values to the other 7s - 12 = 3s - 4 Subtract 3s from both sides 7s - 3s - 12 = 4 4s - 12 = 4 Add 12 to both sides 4s = 4 + 12 4s = 16 Divide both sides by 4 s = 4
You said that 4(2s - 1) = 7s + 12Eliminate parentheses: 8s - 4 = 7s + 12Add 4 to each side: 8s = 7s + 16Subtract 7s from each side: s = 16
Use the following formula: an = a1 + (n - 1)d, where a1 = the first term n = the n th term (general term) d = common difference (which is constant between terms) Since we need to find the 14 th term, we can write: a1 = 100 n = 14 d = -4 an = a1 + (n - 1)d a14 = 100 + (14 - 1)(-4) a14 = 100 + (13)(-4) a14 = 100 - 52 a14 = 48 Thus, the 14 th term is 48.
answer:4
77 / 7 - 777 / 7 - 777 / 7 - 777 / 7 - 7
4
A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.A3 is 4 times bigger than A1, so only a quarter of an A3 sheet can fit into an A1 sheet.
If you mean: 4(2s-1) = 7s+12 then the value of s works out as 16
=IF(A1>4,150,75) In this case if A1 is 4, then 75 will show. If you want 150 to show when A1 is 4 then the formula would be: =IF(A1>=4,150,75)
Bring all the unknown values to one side and the known values to the other 7s - 12 = 3s - 4 Subtract 3s from both sides 7s - 3s - 12 = 4 4s - 12 = 4 Add 12 to both sides 4s = 4 + 12 4s = 16 Divide both sides by 4 s = 4
4 times with a remainder of 3
8 / 7 in long division is however many 7s go into 8. so there's 1x 7 in 8 with 1 remainder. For this example, assume every number beyond is a 10, multiplied by the remainder. so, it'd be 7s into 10, which is 1 again. Then 7s into 30, which is 4. Then 7s into 20, which is 2. Then 7s into 60, which 8. Then 7s into 40, which is 5. Then 7s into 50, which is 7. And this is a reoccuring number, making it 1.142857142857 and so on.
4/7 is in its simplest form.