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There is no value of $x$ that can simultaneously satisfy both the given equations.Therefore, find the 'least squares error' solution to the two equations, i.e., find the value of $x$ that minimizes the sum of squares of the errors in the two equations. $\begin{array}{l}
2 x=3 \\
4 x=1
\end{array}$



Question ID - 155815 | SaraNextGen Top Answer

There is no value of $x$ that can simultaneously satisfy both the given equations.Therefore, find the 'least squares error' solution to the two equations, i.e., find the value of $x$ that minimizes the sum of squares of the errors in the two equations. $\begin{array}{l}
2 x=3 \\
4 x=1
\end{array}$

1 Answer
127 votes
Answer Key / Explanation : (0.5) -

0.5

127 votes


127