![logarithms - Solving $9^{1+\log x} - 3^{1+\log x} - 210 = 0$ where base of log is $3$ for $x$ - Mathematics Stack Exchange logarithms - 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)
logarithms - Solving $9^{1+\log x} - 3^{1+\log x} - 210 = 0$ where base of log is $3$ for $x$ - Mathematics Stack Exchange
![1) Solve: log 27 x=-2/3 2) Write in logarithmic form: 49 1/2 = 7 3) Graph y = -2(3) -x 1)x= 27 -2/3 x = 2) ½ = log ) = -2(1/3) x. - ppt download 1) Solve: log 27 x=-2/3 2) Write in logarithmic form: 49 1/2 = 7 3) Graph y = -2(3) -x 1)x= 27 -2/3 x = 2) ½ = log ) = -2(1/3) x. - ppt download](https://images.slideplayer.com/13/3934825/slides/slide_3.jpg)
1) Solve: log 27 x=-2/3 2) Write in logarithmic form: 49 1/2 = 7 3) Graph y = -2(3) -x 1)x= 27 -2/3 x = 2) ½ = log ) = -2(1/3) x. - ppt download
![PPT - Warm Up Solve. 1. log 16 x = 2. log x 1.331 = 3 3. log10,000 = x PowerPoint Presentation - ID:4526627 PPT - Warm Up Solve. 1. log 16 x = 2. log x 1.331 = 3 3. log10,000 = x PowerPoint Presentation - ID:4526627](https://image2.slideserve.com/4526627/slide1-l.jpg)