百度试题 结果1 题目Write the equation in logarithmic form.5^3=125log_53=125 ○log_35=125 log3 125 = 5O logs 125 = 3 相关知识点: 试题来源: 解析 5^3=125 log5^3=log_12 3lg5=l128 3=(ln|25)/(ty^2) 5125=3 反馈 收藏
Write the equation in logarithmic form. 10^3 =1000 Write the equation in logarithmic form: 5^{ 1} = \frac{1}{5} . Write the equation in logarithmic form. 4^7 = 16,384 Write the equation in logarithmic form. 25 = (1/5)^2 Write the equation in logarithmic form. (\frac{1}{3}...
Write the following logarithmic equation in exponential form: ln (1084) = 6.988. Write the following logarithmic equation in exponential form: ln (\frac{2}{5}) = - 0.916. Write the following logarithmic equation in exponential form: ln (10) = 2.302. Write the logarithmic equation in expo...
Write the equation in logarithmic form: 343 = 7^3. Write the equation in logarithmic form. (\frac{1}{3})^{-4} = 81 Write the equation in logarithmic form. 125^{4/3} = 625 Write the equation in logarithmic form. 25 = (1/5)^2 Write the equation 4^3-3= 1/64 in logarithmic ...
Answer to: Write the exponential equation 2^7= 128 in logarithmic form. By signing up, you'll get thousands of step-by-step solutions to your...
【解析】For logarithmic equations, log,(r)=y is equivalent to b^y=x such that x0 , b0 , and b≠1. In this,b=,x=m, an y=(log_a(m))/(log_a(b))=my=(log_a(m))/(log_a(b)) Substitute the values of b, s, and y into the equation=x.b^((log_0(m))/)(log_a(...
For logarithmic equations, ( ((log))_b(x)=y) is equivalent to ( b^y=x) such that ( x>0), ( b>0), and ( b≠ 1). In this case, ( b=3), ( x=a), and ( y=n).( b=3)( x=a)( y=n)Substitute the values of ( b), ( x), and ( y) into the equation( ...
Answer to: Write the logarithmic equation in exponential form, or write the exponential equation in logarithmic form. 3^5 = 243 By signing up,...
The ellipse equation in standard form involves the location of the ellipse's center and its size. Learn what the standard form of an ellipse...
Write n^{3x} = m in log form. Write as one logarithm: log x - 5 log y + 1 / 2 log z. Write the given equation in logarithmic form. 11^6 = 1,771,561 a. log _6 1,771,561 = 11 b. log _{11} 1,771,561 = 6