subtrahend การใช้

• Rather it increases the subtrahend hundred's digit by one.
• Repeat until all the digit of the subtrahend have been removed.
• Write the subtrahend ( the smallest number ).
• Note that the same sum over the trivial roots gives the last subtrahend in the formula.
• However, the 10 is not taken by reducing the minuend, rather one augments the subtrahend.
• Typically a crutch of a small one is marked just below the subtrahend digit as a reminder.
• For example, the " subtract " subroutine had to form the one's complement of the subtrahend and add it.
• Subtraction is done by adding the ten's complement of the subtrahend, which is the nines'complement plus 1.
• The subtractor is best understood by considering that the subtrahend and both borrow bits have negative weights, whereas the X and D bits are positive.
• Since there was no subtraction instruction, only the twos-complement add ( TAD ), computing the difference of two operands required first negating the subtrahend.
• Formally, the number being subtracted is known as the " subtrahend ", while the number it is subtracted from is the " minuend ".
• To multiply a difference ) by a factor, each summand ( or minuend and subtrahend ) is multiplied by this factor and the resulting products are added ( or subtracted ).
• In other words, the 9's complement of the difference of two numbers is equal to the sum of the 9's complement of the minuend added to the subtrahend.
• The value of the minuend is larger than the value of the subtrahend so that the result is a positive number, but a smaller value of the minuend will result in negative numbers.
• When a subtrahend digit, do not borrow from the minuend digit to its left; instead, carry ( add one ) to the subtrahend digit to its left . Here are some examples.
• When a subtrahend digit, do not borrow from the minuend digit to its left; instead, carry ( add one ) to the subtrahend digit to its left . Here are some examples.
• Continuing the example of, the first variation attempts to subtract 9 from 6, and then 9 from 16, borrowing a 10 by marking near the digit of the subtrahend in the next column.
• Addition was indicated by placing the numbers side by side, subtraction by placing a dot over the subtrahend, and division by placing the divisor below the dividend, similar to our notation but without the bar.
• The first number ( 5 in the previous example ) is formally defined as the " minuend " and the second number ( 3 in the previous example ) as the " subtrahend ".
• In 1678, the publication of Caspar Questel's " De pulvinari morientibus non subtrahend ", ( " " On the pillow of which the dying should not be deprived " " ), initiated debate on the topic.