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## describe the graph of y=1/2x-10 -3 compared to the graph of y=1/x?

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How to Find Equations of Tangent Lines and Normal Lines – For reference, here's the graph of the function and the tangent line we just found. Tangent Lines to Implicit Curves. The procedure doesn't change when working with implicitly defined curves.For better graph take a couple of control points: `(1,1),(1,1/2),(4,1/4)`. Since function is odd, reflect it about origin. Shift the function 1 unit to the right. Example 2. Sketch graph of the function `f(x)=(x+2)^2(x-1)^3`. There is no simpler function that initial function is obtained from.How to describe academic graphs for presentations. Describing academic data with analysis and evaluation. The graph from The Office of National Statistics (2015) shows GDP growth in the UK over the years 1990 to 2015. The y axis is the percentage of growth while the x axis is the individual…

Steps for Sketching the Graph of the Function on eMathHelp – Question: Describe The Graph Of Y = 1/2x – 10 -3 Compared To The Graph Of Y = 1/x. This problem has been solved!SOLUTION: Describe the graph of y=1/2x-10-3 compared to the graph of y=1/x (the -3 is not included in the fraction).At how many points does the graph of y The graph of f(x) + 2 is shifted 2 units up compared to f(x) 2. Blue (original) graph intersect x-axis at two points: at x= -1 and x = 1. x-intercept(s) of a graph is the value(s) of x when y = 0, so x-intercepts of y = (x + 1)(x – 1)^2 are values of x such that…

Describing Graphs | Academic English UK – Functions & Graphing Calculator. Analyze and graph line equations and functions step-by-step. Create my account. I agree to the terms and conditions. 2. Subscribe to get much more: Full access to solution steps.Unfortunately I do not have a graphing program, but it would be no use anyways — the gaps are infinitely fine and cannot be drawn, just like the holes in the lines I mentioned above. The other answers give a very good perspective of that so this graph only pertains to the real part!Shifting the graph vertically upwards by 4 units gives the graph of y = x^2 + 2x + 5. y = x^2 is transformed to y = x^2 + 2x + 5 by shifting it horizontally to the left and vertically upwards. Approved by eNotes Editorial Team.