Consider the number $\displaystyle {6.965}$. Use the log tables to answer the following:

A) Locate the appropriate log values in the center are of the log table, excluding the "Ten Thousandth Parts" portion on the right side of the table. You will enter THREE values from the table. In the middle box, enter the log value for the number given, $\displaystyle {6.965}$. In the boxes on the left and right of the middle box, enter the values you see in the table immediately to the left and immediately to the right of your number's entry.

Entry on Left	log(6.96) Entry	Entry on Right

B) Still taking your number to be $\displaystyle {6.965}$, find the appropriate number from the "Ten Thousandth Parts" portion of the table and enter it below (as a whole number).

Ten Thousandth Part =

C) Using your results so far, what is the final log of $\displaystyle {6.965}$ according to the log tables?

log(6.965) =

LOG RESULTS
N=6.9
n=0.06
N+n = 6.965
Left Entry = 0.842
Main Log = 0.8426
Right Entry = 0.8432
Ten Thousands Part = 3
Final Log Answer = 0.8429
ANTI LOG RESULTS
P = 0.13
p = 0.007
Thousand Part = 0.0009
Main P = 0.137
Base P = 0.1379
Left Power = 1.368
Main Power of 10 = 1.371
Right Power = 1.374
Thousand Part = 3