<p>Breadth-First Search (BFS) algorithm for the directed graph:Determine the shortest paths starting at vertex a to every othernode. Show the resulting spanning tree.</p><p><img src="data:image/png;base64,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" alt="HQWohuusEqwAAAABJRU5ErkJggg=="/></p> Expert Answer Answer to
<p><img alt="Question 1 2 pts The table shows a part of an output of a linear regression model predicting the average fare on different flight routes. Regression Table Constant COUPON
<h3>Question Description</h3> <p>Equations that contain more than one variable, and typically only contain variables, is called a literal equation. The word "literal" comes from the Latin word for letter, littera.