Menentukan Nilai logarima Dengan Tabel Matematika

MJ Basri

25 Apr 202005:17

Summary

TLDRIn this educational video, viewers are taught how to determine the logarithmic value of a number using a base 10 log table. The video explains the structure of the table and demonstrates how to find logarithms for smaller and larger numbers. Two practical examples are given: finding the logarithm of 1.26 and a larger number, 157 million, by using scientific notation and logarithmic properties. The tutorial aims to make logarithmic calculations accessible, with clear, step-by-step explanations and encouragement for viewers to engage with further questions.

Takeaways

😀 The video introduces the concept of logarithms and how to calculate them using a base 10 logarithmic table.
😀 The logarithmic table consists of two parts: the main number (X) and the decimal part (the 'tail' or fractional part).
😀 Logarithms of numbers between 1 and 10 always yield values between 0 and 1, as explained using the table.
😀 The table is used to find the logarithm of a number by matching its whole number part and decimal part.
😀 For example, the logarithm of 1.26 can be found by combining the values of 1.2 and 0.06 from the table.
😀 The logarithm of a number like 1.26 is calculated as 0.401 by adding the values corresponding to its whole and fractional parts.
😀 When dealing with large numbers, such as 157 million, first convert the number into scientific notation to simplify the calculation.
😀 The scientific notation for 157 million is 1.57 × 10^8, and the logarithm of this expression can be split into two parts: the logarithm of 1.57 and the logarithm of 10^8.
😀 The logarithm of 10^8 is simply 8, based on the rule that log(10^n) = n.
😀 The final logarithm for 157 million is the sum of the logarithms of 1.57 (0.196) and 10^8 (8), resulting in approximately 8.196.
😀 Viewers are encouraged to engage with the content by liking, commenting, sharing, and subscribing to the channel for more educational videos.

Q & A

What is the purpose of the logarithm table in this tutorial?
-The logarithm table is used to quickly determine the logarithmic values of numbers, especially when dealing with large values. It helps simplify the process by providing pre-calculated logarithmic values for numbers between 1.0 and 9.9.
What do the numbers in the 'X' column of the logarithm table represent?
-The numbers in the 'X' column represent the whole part of the number for which you want to find the logarithmic value. They range from 1.0 to 9.9.
How do you determine the decimal part of a logarithmic value using the table?
-To determine the decimal part, you look for the number to the right of the decimal in the number you're finding the logarithm for. For example, in 1.26, the 'X' column will provide 1.2, and the decimal part (6) is found in the second column.
What does the result of a logarithmic value between 1 and 10 typically look like?
-For numbers between 1 and 10, the logarithmic value will always start with '0.' This is because log10(1) = 0, and log10(10) = 1. So, values for these numbers will fall between 0 and 1.
What is the process for finding the logarithm of a number like 1.26?
-First, find 1.2 under the 'X' column of the table, and then look for the decimal part (6) in the second column. The intersection of these two gives the logarithmic value, which in this case is 0.100.
How do you calculate the logarithmic value of large numbers like 157 million?
-To calculate the logarithmic value of large numbers, first convert the number to scientific notation. For 157 million, this becomes 1.57 × 10^8. Then, use the logarithmic properties to calculate the logarithm of the base (1.57) and the exponent (8).
What is the significance of the scientific notation in the logarithmic calculation of large numbers?
-Scientific notation allows large numbers to be broken down into a manageable form, making it easier to find the logarithmic value. The base part (1.57) can be looked up in the logarithm table, and the exponent part (10^8) can be handled using the logarithmic property log(a × 10^n) = log(a) + n.
What is the logarithmic value of 10^8, and why is it useful?
-The logarithmic value of 10^8 is 8, since log10(10^n) = n. This is useful when dealing with large numbers in scientific notation, as it allows us to separate the base and exponent in the calculation.
How do you combine the logarithmic values when calculating numbers in scientific notation?
-When calculating numbers in scientific notation, you simply add the logarithmic value of the base and the logarithmic value of the exponent. For example, log(1.57 × 10^8) is calculated as log(1.57) + log(10^8), which is 0.196 + 8 = 8.196.
What should viewers do if they don’t understand a logarithmic problem after watching the video?
-Viewers are encouraged to comment below the video if they have any questions or if they don't understand a logarithmic problem. The creator will be happy to assist and provide further clarification.