The National Arithmetic on the Inductive System Combining the Analytic and Synthetic Methods Forming a Complete Course of Higher ArithmeticLeach, Shewell and Sanborn, 1863 - 444 σελίδες |
Αναζήτηση στο βιβλίο
Αποτελέσματα 1 - 5 από τα 5.
Σελίδα 226
... CONTINUED FRACTIONS . 307. A CONTINUED FRACTION is a fraction 226 CIRCULATING DECIMALS . Addition of Common Frac- tions.
... CONTINUED FRACTIONS . 307. A CONTINUED FRACTION is a fraction 226 CIRCULATING DECIMALS . Addition of Common Frac- tions.
Σελίδα 227
Benjamin Greenleaf. CONTINUED FRACTIONS . 307. A CONTINUED FRACTION is a fraction having for its numerator 1 , and for its denominator a whole number plus a fraction whose numerator is 1 , and whose denominator is a whole number plus a ...
Benjamin Greenleaf. CONTINUED FRACTIONS . 307. A CONTINUED FRACTION is a fraction having for its numerator 1 , and for its denominator a whole number plus a fraction whose numerator is 1 , and whose denominator is a whole number plus a ...
Σελίδα 228
... fraction in the denominator , and taking the 1 199 1 , we have = 3 + 1 / 1 19 By neglecting instead of the for the second approximate value of 19 31 the given fraction ; which approximation ... continued fraction . 228 CONTINUED FRACTIONS .
... fraction in the denominator , and taking the 1 199 1 , we have = 3 + 1 / 1 19 By neglecting instead of the for the second approximate value of 19 31 the given fraction ; which approximation ... continued fraction . 228 CONTINUED FRACTIONS .
Σελίδα 229
Benjamin Greenleaf. EXAMPLES . 2. Transform 3 into a continued fraction . Ans . 1 2 + 1 3+ 3. Transform 261 into a continued fraction . 4. Find the approximate values of 29. Ans . ,,,, 74 . 5. Find the first five approximate values of ...
Benjamin Greenleaf. EXAMPLES . 2. Transform 3 into a continued fraction . Ans . 1 2 + 1 3+ 3. Transform 261 into a continued fraction . 4. Find the approximate values of 29. Ans . ,,,, 74 . 5. Find the first five approximate values of ...
Σελίδα 402
... continued to infinity , it becomes what is called an infinite series , whose last term must always be regarded as 0 , and its ratio as a fraction . To find the sum of an infinite series , Divide the first term by 1 decreased by the fraction ...
... continued to infinity , it becomes what is called an infinite series , whose last term must always be regarded as 0 , and its ratio as a fraction . To find the sum of an infinite series , Divide the first term by 1 decreased by the fraction ...
Άλλες εκδόσεις - Προβολή όλων
Συχνά εμφανιζόμενοι όροι και φράσεις
25 per cent 30 days acres annexed annuity Arithmetic balance bank discount barrels becoming due bill bought bushels ciphers circumference column common denominator common fraction compound interest compound numbers contain continued fraction cost cube root decimal places decimal point diameter difference dividend division dollars equal equivalent EXAMPLES expressed decimally feet long figures gallons given number given rate grains greatest common divisor Hence hogshead hundred hundredths improper fraction inches least common multiple less longitude lowest terms miles minuend mixed number months multiplicand Multiply NOTE number denoting number of days number of terms obtain order or place paid par value payable payment pounds premium present worth prime factors principal proceeds proportion purchased quantity quotient rate per cent ratio Reduce remainder repetend rods RULE SECOND OPERATION share shillings sold square root subtract tens third thousand thousandths tons units weight whole number write yards