![phuwintang on Twitter: "ถามพ่อ “log 0 เท่ากับเท่าไหร่?” พ่อตอบ “1” พิมพ์หาใน google 😳😳(ตอบถูกด้ายงัยเนี่ยยยย)… " phuwintang on Twitter: "ถามพ่อ “log 0 เท่ากับเท่าไหร่?” พ่อตอบ “1” พิมพ์หาใน google 😳😳(ตอบถูกด้ายงัยเนี่ยยยย)… "](https://pbs.twimg.com/media/Dlm-8UfU8AA7SN0.jpg)
phuwintang on Twitter: "ถามพ่อ “log 0 เท่ากับเท่าไหร่?” พ่อตอบ “1” พิมพ์หาใน google 😳😳(ตอบถูกด้ายงัยเนี่ยยยย)… "
![How to solve 13 and 14 question please: 13 log0 75 log2 0 125-2 is equal toa - Maths - Relations and Functions - 12642133 | Meritnation.com How to solve 13 and 14 question please: 13 log0 75 log2 0 125-2 is equal toa - Maths - Relations and Functions - 12642133 | Meritnation.com](https://s3mn.mnimgs.com/img/shared/content_ck_images/ck_5af58c480577c.png)
How to solve 13 and 14 question please: 13 log0 75 log2 0 125-2 is equal toa - Maths - Relations and Functions - 12642133 | Meritnation.com
![Why are there two different types of graph for logarithmic functions $\log_a{X}$ for different range of base,i.e., for : $0<a<1$ and $a>1$? - Mathematics Stack Exchange Why are there two different types of graph for logarithmic functions $\log_a{X}$ for different range of base,i.e., for : $0<a<1$ and $a>1$? - Mathematics Stack Exchange](https://i.stack.imgur.com/iKbP7.jpg)
Why are there two different types of graph for logarithmic functions $\log_a{X}$ for different range of base,i.e., for : $0<a<1$ and $a>1$? - Mathematics Stack Exchange
![Rules of Logs 1: A log with no base has a base of 10 Ex: log 100 = 2 log = 2 100 = 102 2: Domain of logs log (~) ~ > ppt video online download Rules of Logs 1: A log with no base has a base of 10 Ex: log 100 = 2 log = 2 100 = 102 2: Domain of logs log (~) ~ > ppt video online download](https://slideplayer.com/6865626/23/images/slide_1.jpg)
Rules of Logs 1: A log with no base has a base of 10 Ex: log 100 = 2 log = 2 100 = 102 2: Domain of logs log (~) ~ > ppt video online download
![Solving $9^{1+\log x} - 3^{1+\log x} - 210 = 0$ where base of log is $3$ for $x$ - Mathematics Stack Exchange Solving $9^{1+\log x} - 3^{1+\log x} - 210 = 0$ where base of log is $3$ for $x$ - Mathematics Stack Exchange](https://i.stack.imgur.com/OR8Rm.jpg)
Solving $9^{1+\log x} - 3^{1+\log x} - 210 = 0$ where base of log is $3$ for $x$ - Mathematics Stack Exchange
![Evaluation Logarithms Common Log log b 1 = 0log 1 = 0 log b b = 1log 10 = 1 log b b m = mlog 10 s = s b log b x = x 10 log x = x log b 0 is not defined. - ppt download Evaluation Logarithms Common Log log b 1 = 0log 1 = 0 log b b = 1log 10 = 1 log b b m = mlog 10 s = s b log b x = x 10 log x = x log b 0 is not defined. - ppt download](https://slideplayer.com/9854854/32/images/slide_1.jpg)
Evaluation Logarithms Common Log log b 1 = 0log 1 = 0 log b b = 1log 10 = 1 log b b m = mlog 10 s = s b log b x = x 10 log x = x log b 0 is not defined. - ppt download
![Prove that $a^x - b^y = 0$ where $x = \sqrt{\log_a b}$ & $y = \sqrt{\log_b a}$ , $a > 0$, $b > 0$ & $a, b \ne1$ - Mathematics Stack Exchange Prove that $a^x - b^y = 0$ where $x = \sqrt{\log_a b}$ & $y = \sqrt{\log_b a}$ , $a > 0$, $b > 0$ & $a, b \ne1$ - Mathematics Stack Exchange](https://i.stack.imgur.com/3s16p.jpg)