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sbhatnagar
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Solve the equation
$$2^{|x+2|}-|2^{x+1}-1|=2^{x+1}+1$$
$$2^{|x+2|}-|2^{x+1}-1|=2^{x+1}+1$$
sbhatnagar said:Solve the equation
$$2^{|x+2|}-|2^{x+1}-1|=2^{x+1}+1$$
The first step in solving this equation is to distribute the absolute value bars and simplify the equation. This will help to eliminate any absolute value expressions.
Yes, you can use logarithms to solve this equation. Taking the logarithm of both sides of the equation can help to isolate the variable and solve for its value.
The possible solutions for this equation are x = -3, x = 1, and x = 2. These values can be found by plugging in the possible solutions and checking if the equation holds true.
Unfortunately, there is no shortcut or trick to solving this equation. It requires a step-by-step approach and careful algebraic manipulation to find the solutions.
Yes, you can use a graphing calculator to solve this equation. By graphing both sides of the equation and finding the point(s) of intersection, you can determine the values of x that satisfy the equation.