### Фй лЭне пй чсЮуфет -Уэнфбоз ксйфйкЮт

Ден енфпрЯубме ксйфйкЭт уфйт ухнЮиейт фпрпиеуЯет.

### ДзмпцйлЮ брпурЬумбфб

УелЯдб v - Decedents," and to repeal said original sections, -and to repeal sections one (1), two (2), three (3), four (4), five (5), six (6), seven (7), eight (8), nine (9), ten (10), eleven (11), twelve (12...
УелЯдб 144 - January 31, February 28, March 31, April 30, May 31, June 30, July 31, August 31, September 30, October 31, November 30, December 31.
УелЯдб 82 - Multiplication is a process, shorter than addition, for rinding the sum when one number is to be used as an addend several times. The number to be used as the addend is called the Multiplicand. The number showing how many times the multiplicand is to be used is called the Multiplier.' The result of multiplication is called the Product. The expression,
УелЯдб 190 - Place the divisor to the left of the dividend and proceed as in division of whole numbers ; in the quotient, point off as many decimal places as the number of decimal places in the dividend exceeds the number of decimal places in the divisor, prefixing ciphers to the quotient, if necessary.
УелЯдб 97 - Division is the process of finding how many times one number contains another, or of separating a number into equal parts.
УелЯдб 191 - After dividing the 2868 (neglecting the 0's on the left) by 239, the quotient is 12; but the excess of decimal places in the dividend over those in the divisor is three. Therefore, the quotient must contain three decimal places.
УелЯдб 133 - Subtract the numerator of the subtrahend from the numerator of the minuend, and place the difference over the common denominator.
УелЯдб 118 - The GREATEST COMMON DIVISOR OF TWO OR MORE NUMBERS is the largest number which is a divisor of each of them.
УелЯдб 65 - ... 30 thirty 40 forty 50 fifty 60 sixty 70 seventy 80 eighty 90 ninety 100 one hundred 200 two hundred 300 three hundred 400 four hundred 500 five hundred 600 six hundred 700 seven hundred 800 eight hundred 900 nine hundred...
УелЯдб 166 - Divide the greater number by the less, then the less number by the remainder ; thus continue to divide the last divisor by the last remainder, until there is no remainder. The last divisor will be the greatest common divisor. NOTE.