TI-84 documentation

Solving Equations

Follow the steps while keeping the calculator open in another tab.

A graphing calculator can help solve equations by graphing both sides, finding roots, checking tables and using numeric tools. This guide focuses on practical classroom methods rather than symbolic algebra.

Quick tip: Keep the calculator page open in another tab while reading this guide. Try each step immediately so the button sequence becomes familiar.

Solve by graphing roots

Move all terms to one side so the equation becomes expression = 0. Enter the expression as Y1 and graph it. X-intercepts are solutions.

For example, solving x^2-4=0 means graphing Y1=X^2-4 and finding where the graph crosses the x-axis.

Solve by intersections

Enter the left side as Y1 and the right side as Y2. The x-values where the graphs intersect are solutions.

This method is useful when moving all terms to one side is inconvenient or when comparing two models.

Use the table

The table can help narrow down where a solution occurs. Look for places where Y changes sign or where two functions have similar values.

Tables are especially helpful before using trace or a numeric intersection tool.

Estimate vs exact answers

Graphing calculators often provide decimal approximations. Some algebra problems require exact answers such as radicals or fractions.

Use calculator answers to check work, but follow teacher instructions when exact symbolic answers are required.

Window matters

A solution can be outside the visible graph window. If you expect more roots than you see, widen the x-range or use a table to search.

For polynomials, there may be several roots. For exponentials or logarithms, the useful range may be smaller or shifted.

Quick reference table

Equation typeCalculator strategy
f(x)=0Graph Y1=f(x), find x-intercepts
f(x)=g(x)Graph both, find intersections
Approximate rootUse trace or table
Multiple rootsWiden window and inspect sign changes
Exact algebra answerUse calculator as a check, not replacement

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