How many sacks are there?

7 ANSWERS

1. 
   

   There are two possible readings of this: either the top layer has 16 sacks LENGTHWISE, or the top layer actually has 16 sacks (four wide x four long).
   
   As someone else has worked the first reading (correctly!), I'll take the second:
   
   One trapezoidal face of the pile, along the length, has
   
   20+19+18+17+16+15+14+13+12+11+10+9+8+7... sacks.
   
   Looking for a lazy way to add this, I notice that this is equal to the triangular number of order 16 (the sum of the numbers 1 through 16) plus 17 fours. That triangular number can further be simplified to
   
   (1+16) + (2+15) + (3+14) + ... + (7+10) + (8+9), so it's equal to eight 17s. The whole face therefore contains 12*17 sacks, and since the entire pile is four sacks wide, there are
   
   4 * 12 * 17 = 816 sacks
   
   

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2. 
   

   4(20 + 19 + 18 + 17 + 16) = 4(90) = 360 sacks

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3. 
   

   4(20+19+18+17+16+15+14+
   
   13+12+11+10+9+8+7+6+5+4)
   
   =4(204)=816 sacks,
   
   assuming you meant a total of 16 sacks on the top, not 16*4.
   
   If you were talking 16*4 on the top, then it would be:
   
   4(20+19+18+17+16)=4(90)=360 sacks.

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4. 
   

   
   
   The basic formula is the summation of all the sacks on each layer:
   
   L(n1) = 20, W(n1) = 4
   
   L(n2) = 19, W(n2) = 4
   
   L(n3) = 18, W(n3) = 4
   
   L(n4) = 17, W(n4) = 4
   
   L(n5) = 16, W(n5) = 4
   
   Since the width for all the layers is the same, we will simplly refer to the width with W = 4.
   
   The formula for the sum is reduced to
   
   S(L,W) = W (L(n1) + L(n2) + L(n3) + L(n4) + Ln5)
   
   Substitute the values and calculate the result:
   
   S(L, W) = 4(20 + 19 + 18 + 17 + 16)
   
   S(L, W) = 360

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5. 
   

   Bottom layer --> 4 x 20 = 80
   
   Next layer --> 4 x 19 = 76
   
   Next layer --> 4 x 18 = 72
   
   Next layer --> 4 x 17 = 68
   
   Next layer --> 4 x 16 = 64
   
   Total = 5 x 72 = 360 sacks

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6. 
   

   there is 360 sacks

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7. 
   

   Total bags = 4(20 + 19 + 18 + 17 + 16)
   
   = 4 × 90 = 360 bags
   
   --------  

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