INTRO:
When it comes to solving equations, it is often important to be able to identify and solve the inverse of a given equation. An inverse equation is simply the same equation written in a different form, with the order of the terms reversed. Knowing how to identify and solve an inverse equation can be a useful tool in solving complex equations. In this article, we will look at the inverse equation of the equation y = 16×2 + 1.
Identifying the Inverse Equation
In order to identify the inverse equation of y = 16×2 + 1, we need to look at the structure of the equation. In this equation, y is the dependent variable, while x is the independent variable. The coefficient of x2 is 16, and the constant is 1. To find the inverse equation, we need to switch the dependent and independent variables, and reverse the order of the terms. This gives us the inverse equation x = (y – 1)/16.
Solving for the Inverse Equation
Once we have identified the inverse equation, we can then solve for the value of x. To do this, we need to substitute the given value of y into the inverse equation. For example, if y = 33, then we can substitute this into the equation to get x = (33 – 1)/16, which simplifies to x = 2.
We can also solve for the inverse equation graphically. To do this, we need to plot the given equation on a graph. Then, we can draw a line of symmetry through the origin. This line of symmetry will be the inverse equation. The point where the line of symmetry intersects with the graph of the original equation will be the inverse of the given point.
OUTRO:
In summary, the inverse equation of y = 16×2 + 1 is x = (y – 1)/16. This equation can be solved either algebraically or graphically, depending on the given value of y. Knowing how to identify and solve inverse equations can be a useful tool in solving complex equations.