sqrt(t/10)=sqrt(2t-114) One solution was found :                        t = 60 Radical Equation entered :      √t/10 = √2t-114 Step by step solution : Step  1  :Isolate a square root on the left ...

\displaystyle\sqrt{{\frac{{49}}{{36}}}},{3},{3}\frac{{3}}{{5}},\sqrt{{14}} Explanation: The first problem is that the values are all in different formats. Comparing decimals is the easiest to ...

First, the transformation you applied should not have \sqrt {5} - this is for a t-statistic for the sample mean. You are basically dealing with a binomial distribution here. Consider the indicator ...

Since equations and boundary conditions are homogeneous, you get a linear subspace of solutions. One can also say that you have 2 conditions for 3 unknown parameters. So set b=1. Also explore the ...

Use a Taylor series (or equivalently the Binomial Theorem) to expand around c. This is valid provided |d-c| \lt |a+b+c|: \eqalign{ &\frac{1}{\sqrt{a+b+c}} - \frac{1}{\sqrt{a+b+d}}\\ &= (a+b+c)^{-1/2} - (a+b+c + (d-c))^{-1/2} \\ &= (a+b+c)^{-1/2} - (a+b+c)^{-1/2}\left(1 + \frac{d-c}{a+b+c}\right)^{-1/2} \\ &= (a+b+c)^{-1/2} - (a+b+c)^{-1/2}\sum_{j=1}^{\infty}\binom{-1/2}{j}\left(\frac{d-c}{a+b+c}\right) ^j\\ &= \frac{1}{2}(a+b+c)^{-3/2}(d-c) - \frac{3}{8}(a+b+c)^{-5/2}O(d-c)^2 } ...

You will use the significance level to find a cutoff point that you will compare to the value you calculated for the test statistic. The cutoff point you use will depend on whether you are using a ...