How do you graph $y = {log}_{2} (x + 1) + 3$ $y=log_2(x+1)+3$ ?

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How do you graph $y = {log}_{2} (x + 1) + 3$ $y=log_2(x+1)+3$ ?

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Answer 1 · 2017-01-19T14:11:04

Please see below.

Explanation:

As the equation is $y = {log}_{2} (x + 1) + 3$ $y=log_2(x+1)+3$ ,

the domain of $y$ $y$ is the set of all $x$ $x$ values such that $x + 1 > 0$ $x+1>0$ or $x > - 1$ $x> -1$

and the range of $y$ $y$ is the interval $(- \infty, + \infty)$ $(-oo,+oo)$ .

Hence as $x \to - 1$ $x->-1$ , $y \to - \infty$ $y->-oo$ i.e. $x + 1 = 0$ $x+1=0$ is the asymptote.

Now let us select a few values of $x$ $x$ , choosing so that calculating ${log}_{2} (x + 1)$ $log_2(x+1)$ is easy. Hence, let $x$ $x$ take values ${0, 1, 3, 7, 15}$ ${0,1,3,7,15}$ and for these values, $y$ $y$ takes values ${3, 4, 5, 6, 7}$ ${3,4,5,6,7}$ and hence points on the graph are

$(0, 3)$ $(0,3)$ ; $(1, 4)$ $(1,4)$ ; $(3, 5)$ $(3,5)$ ; $(7, 6)$ $(7,6)$ and $(15, 7)$ $(15,7)$

and graph appears as follows:
graph{2^(y-3)=x+1 [-4.87, 15.13, -1.92, 8.08]}

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How do you graph $y = {log}_{2} (x + 1) + 3$ $y=log_2(x+1)+3$ ?

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