เข้าสู่ระบบ สมัครสมาชิก

repeating decimal การใช้

"repeating decimal" แปล  
ประโยคมือถือ
  • A repeating decimal can also be expressed as an infinite series.
  • In English, there are various ways to read repeating decimals aloud.
  • He proposed the use of repeating decimals and other random sequences for error correction coding and cryptography.
  • In these applications, repeating decimals to base 2 are generally used which gives rise to binary sequences.
  • That is, a repeating decimal can be regarded as the sum of an infinite number of rational numbers.
  • The characterization of such numbers can be done using repeating decimals ( and thus the related fractions ), or directly.
  • Understand that a repeating decimal represents an incomplete division . . 333 . . . is not equal to 1 / 3.
  • Decimal fractions have terminating decimal representations and other fractions have repeating decimal representations, whereas irrational numbers have infinite non-repeating decimal representations.
  • Decimal fractions have terminating decimal representations and other fractions have repeating decimal representations, whereas irrational numbers have infinite non-repeating decimal representations.
  • Then the digits in the second half of the repeating decimal period are the 9s complement of the corresponding digits in its first half.
  • The cyclic behavior of repeating decimals in multiplication also leads to the construction of integers which are cyclically permuted when multiplied by certain numbers.
  • First recognize that " X " is the repeating digits of a repeating decimal, which always possesses cyclic behavior in multiplication.
  • First recognize that " X " is the repeating digits of a repeating decimal, which always possesses a cyclic behavior in multiplication.
  • If it does not I believe that would mean that either no repeating decimal has a distinct location or that there are odd gaps in the continuum.
  • You could code the info into digits of 0-9 and then use a fraction-reverser to find the fraction of that set of repeating decimals.
  • My dad refuses this proof because he says the repeating decimal never actually exactly equals the fraction; therefore, . 999 . . . never quite equals 1.
  • I don't follow how you reach your conclusion that " either no repeating decimal has a distinct location or that there are odd gaps in the continuum ".
  • *PM : converting a repeating decimal to a fraction, id = 9185 new !-- WP guess : converting a repeating decimal to a fraction-- Status:
  • *PM : converting a repeating decimal to a fraction, id = 9185 new !-- WP guess : converting a repeating decimal to a fraction-- Status:
  • It is necessary for F to be coprime to 10 in order that is a repeating decimal without any preceding non-repeating digits ( see multiple sections of Repeating decimal ).
  • ตัวอย่างการใช้เพิ่มเติม:   1  2  3