Keyword | CPC | PCC | Volume | Score |
---|---|---|---|---|

value of log 2 base 4 | 1.98 | 0.3 | 1006 | 33 |

value of log 2 base 2 | 1.32 | 0.5 | 535 | 7 |

value of log 2 base 3 | 1.42 | 0.6 | 2941 | 31 |

value of log 5 base 2 | 1.39 | 0.6 | 3043 | 7 |

log base 4 of 1/2 | 0.91 | 0.1 | 1223 | 41 |

log base 2 of 1/4 | 1.41 | 0.1 | 78 | 21 |

log 1 base 2 value | 0.8 | 0.9 | 9133 | 64 |

log2 base 2 value | 1.41 | 0.8 | 7949 | 96 |

what is the value of log 2 base 2 | 1.84 | 0.7 | 4271 | 6 |

value of log 4 base 2 | 0.12 | 1 | 2817 | 78 |

value of log 2 base e | 1.48 | 0.7 | 8729 | 2 |

what is log 2 base 2 | 0.97 | 0.6 | 8721 | 37 |

log base 2 of 1/2 | 1.87 | 0.8 | 1692 | 26 |

log base 2 of 1 | 1.48 | 0.5 | 5684 | 44 |

log base 2 is equal to | 0.6 | 0.2 | 3519 | 39 |

For instance, we can say that the log with base 2 of 8 is 3. Similarly, log₂ 16 = 4 or log₂ 32 = 5. But what is, say, log₂ 5? Surely, 5 is not a power of 2. To be precise, it's not an integer power of 2. We have to remember that there are also fractional exponents, and indeed, here, we need one of those.

For instance, we can easily observe that log₂ 4 = 2. Seemingly, 2 is a number like any other. However, it has some interesting properties. E.g., it is the smallest prime number and the only even one. Moreover, it's the base for any computer-related operations via the binary representation.

Conventionally, log implies that base 10 is being used, though the base can technically be anything. When the base is e, ln is usually written, rather than log e. log 2, the binary logarithm, is another base that is typically used with logarithms. If for example: Each of the mentioned bases are typically used in different applications.

Find the logarithm with base 10 of number 2. lg (2) = 0.30103. Divide these values by one another: lg (100)/lg (2) = 2 / 0.30103 = 6.644. You can also skip steps 3-5 and input the number and base directly into the log calculator. Evidence suggests that the notion of logarithms was already present in 8th century India.