96 AN ESSAY ON THE ROOTS OF INTEGERS, 



of. Multiply 3, the second found figure of the Root, into this 220,750, 

 and write the product 662,250 in the Ran k of the Biquadrate opposite to 

 and immediately above 3,535,365, the upper number in that Rank by 

 Art. r'. 



j8'. Add together in the Rank of the Biquadrate this 662,250 and 

 3,535,365, and write the sum 4,197,615 opposite to and immediately above 

 them. 



/. Transfer this 4,197,615 to the right hand two places. This 4,197,615 

 so transferred, is now the upper number in the Rank of the Biquadrate. 



V. Add 3, the second found figure of the Root, to 129, the upper num- 

 ber in the Rank of the Latus by Art. v', and write the sum 132 opposite 

 to and immediately above it. This 132 is now the upper number in the 

 Rank of the Latus. 



g'. Multiply .3, the second found figure of the Root, into this 1 32, and 

 write the product 396 in the Rank of the Square opposite to and imme- 

 diately above 7,134, the upper number in that Rank by Art. x'. 



%. Add together in the Rank of the Square this 396 and 7,134, and 

 write the sum 7,530 opposite to and immediately above them. This 

 7,530 is now the upper number in the Rank of the Square. 



vf. Multiply 3, the second found figure of the Root, into this 7,530, and 

 write the product 22,590 in the Rank of the Cube opposite to and imme- 

 diately above 220,750, the upper number in that Rank by Art. z'. 



