Introduction to The National Arithmetic: On the Inductive System Combining the Analytic and Synthetic Methods in which the Principles of the Science are Fully Explained and Illustrated : Designed for Common Schools and Academies |
From inside the book
Results 1-5 of 15
Page 27
... Subtrahend . The answer , or number found by the operation , is called the Difference , or Remainder . NOTE . The words minuend and subtrahend are derived from two Latin words ; the former from minuendum , which signifies to be ...
... Subtrahend . The answer , or number found by the operation , is called the Difference , or Remainder . NOTE . The words minuend and subtrahend are derived from two Latin words ; the former from minuendum , which signifies to be ...
Page 28
... subtrahend is less than the figure above it in the minuend . Ex . 1. Let it be required to take 245 from 468 , and to find their difference . Ans . 223 . OPERATION . Minuend 468 Subtrahend 245 Remainder 223 We place the less number ...
... subtrahend is less than the figure above it in the minuend . Ex . 1. Let it be required to take 245 from 468 , and to find their difference . Ans . 223 . OPERATION . Minuend 468 Subtrahend 245 Remainder 223 We place the less number ...
Page 29
... Subtrahend 342 We first take the 2 units from the 4 units , and find the difference to be 2 units , which we write under the figure subtracted . We then proceed to take the 4 tens from the 2 tens Remainder 282 above it ; but we here ...
... Subtrahend 342 We first take the 2 units from the 4 units , and find the difference to be 2 units , which we write under the figure subtracted . We then proceed to take the 4 tens from the 2 tens Remainder 282 above it ; but we here ...
Page 30
... subtrahend if the work is right . This method of proof depends on the principle , That the smaller of any two numbers is equal to the remainder obtained by subtracting their difference from the greater . EXAMPLES FOR PRACTICE . 2 . 2 ...
... subtrahend if the work is right . This method of proof depends on the principle , That the smaller of any two numbers is equal to the remainder obtained by subtracting their difference from the greater . EXAMPLES FOR PRACTICE . 2 . 2 ...
Page 30
... subtrahend if the work is right . This method of proof depends on the principle , That the smaller of any two numbers is equal to the remainder obtained by subtracting their difference from the greater . EXAMPLES FOR PRACTICE . 2 . 2 ...
... subtrahend if the work is right . This method of proof depends on the principle , That the smaller of any two numbers is equal to the remainder obtained by subtracting their difference from the greater . EXAMPLES FOR PRACTICE . 2 . 2 ...
Other editions - View all
Common terms and phrases
annexed annuity barrels of flour bill Bought bushels called cancel ciphers circumference column common denominator common difference common fraction composite number compound interest compound numbers containing cost cube root cubic feet currency decimal diameter discount Divide the product dividend division equal EXAMPLES FOR PRACTICE farthings find the interest gallons Give the reason given number given sum greatest common divisor Hence hogshead improper fraction inches interest of $1 least common multiple leaves less miles mills minuend mixed number molasses months multiplicand Multiply NOTE number of terms obtain paid payment pence present worth prime factors prime number principal purchase quantity quarts QUESTIONS quotient rate per cent ratio received Reduce remainder rule for finding shillings side simple fraction simple numbers sold solid square feet square root subtract subtrahend tens thousand thousandths tons Troy Weight United States money whole number write yards
Popular passages
Page 141 - RULE. Multiply all the numerators together for a new numerator, and all the denominators for a new denominator: then reduce the new fraction to its lowest terms.
Page 151 - Multiplication is the process of taking one number as many times as there are units in another.
Page 185 - When a decimal number is to be divided by 10, 100, 1000, &c., remove the decimal point as many places to the left as there are ciphers in the divisor, and if there be not figures enough in the number, prefix ciphers.
Page 281 - A sphere is a solid, bounded by one continued convex surface, every point of which is equally distant from a point within, called the centre.
Page 205 - Compute the interest to the time of the first payment ; if that be one year or more from the time the interest commenced, add it to the principal, and deduct the payment from the sum total. If there be...
Page 181 - Place the subtrahend under the minuend, so that the decimal points will be directly under each other. Subtract as in whole numbers, and place the decimal point in the remainder directly under the decimal points above.
Page 132 - The greatest common divisor of two or more numbers is the greatest number that will divide each of them without a remainder. Thus 6 is the greatest common divisor of 12, 18, and 24.
Page 134 - The least common multiple of two or more numbers is the least number that can be divided by each of them without a remainder ; thus 30 is the least common multiple of 10 and 15.
Page 205 - But if any payments be made before one year's interest hath accrued, then compute the interest on the principal sum due on the obligation for one year,* add it to the principal, and compute the interest on the sum paid from the time it was paid up to the end of the year ; add it to the sum paid, and deduct that sum from the principal and interest added together.
Page 154 - Multiply the numerators together for a new numerator, and the denominators together for a new denominator.