Calculate the percentage increase or decrease between two values. Find percent change, new value from a percent, or the original value. Includes multiplier, reverse change, compound growth table, a...
The **Percent Change Calculator** computes how much a value has increased or decreased in percentage terms. It answers the three most common variation questions: given two values find the percent change, given a starting value and a percent find the result, or given a final value and the percent find the original.
Percent change is one of the most widely used measures in finance, economics, science, and daily life. Whether you are tracking stock price movements, comparing this quarter's revenue to the last, monitoring weight loss, or measuring experimental results, percent change puts the shift into a standardized, easily understood proportion.
The formula is straightforward: **Percent Change = ((New − Old) / |Old|) × 100**. A positive result signals an increase and a negative result signals a decrease. The absolute value of the old value in the denominator ensures correct handling of negative starting points.
Beyond the basic calculation this tool also reports the **absolute change** (the raw numeric difference), the **multiplier** (new / old, handy for spreadsheets), the **reverse percent change** (how much change is needed to go back), and a **compound growth table** that projects repeated percentage changes over ten steps — useful for interest rates, inflation, or any exponential growth scenario.
Preset buttons let you explore typical scenarios like salary raises, discounts, and stock price movements. Visual bars provide an at‑a‑glance comparison of old and new values and the magnitude of the change.
This calculator is useful because percent-change questions appear in several forms, and the denominator logic is easy to misuse when switching between them. Here you can move between three modes: comparing an old value to a new one, applying a percent to generate a new result, or reversing a known change to recover the original value. That reduces the common mistake of using the right formula for the wrong question.
It is also strong for practical interpretation. The output does not stop at the headline percentage. You also get the absolute change, multiplier, reverse change, and a before-versus-after visual that makes it easier to explain discounts, raises, growth rates, and declines to non-technical users. The compound-growth table extends the idea from a single step to repeated changes, which is where many real finance and forecasting problems become interesting.
Percent change = ((new − old) / |old|) × 100. New from % = old × (1 + pct/100). Old from new + % = new / (1 + pct/100). Reverse % = −pct / (1 + pct/100).
Result: 30% increase
The value rises from 50 to 65, so the absolute change is 15. Dividing 15 by the original 50 gives 0.30, which is a 30% increase.
The calculator separates three tasks that are often mixed together. In calculation mode, you compare an old value with a new value and measure the directional change. In new-value mode, the second input represents a percentage that is applied to the starting amount. In original-value mode, the first input is the result after a known increase or decrease, and the tool works backward to recover the starting point. Keeping those cases distinct prevents denominator errors and makes the inputs much easier to interpret.
Percent change alone can hide scale. A 25% increase on 80 and a 25% increase on 80,000 have very different practical implications, so the absolute-change card shows the raw amount gained or lost. The multiplier card converts the percentage into a factor such as $ imes 1.25$ or $ imes 0.90$, which is often the most convenient format for spreadsheets and financial models. The reverse-change card is especially important because a drop of 20% does not require a 20% increase to return to the start; the recovery percentage is larger.
The compound-growth table demonstrates what happens when the same rate is applied again and again. This is useful for inflation, recurring revenue growth, population change, and depreciation models. Instead of treating percent change as a one-off operation, the table shows the cumulative effect over ten steps and pairs each row with a simple bar visual. That turns the calculator into a small forecasting aid as well as a basic arithmetic tool.
Percent change measures the relative difference between an old and new value: ((New − Old) / |Old|) × 100. Positive results mean increase, negative means decrease.
Percent change is directional from an original value to a new value, while percent difference compares two values symmetrically using their average as the denominator. That makes percent change the better choice when you have a clear before-and-after relationship.
Percent change is used in finance, economics, science, pricing, grades, and other everyday comparisons where the change needs to be measured relative to a starting point. It is the standard way to describe growth, decline, and year-over-year movement.
Percent change = ((new − old) / |old|) × 100. A positive result means an increase; a negative result means a decrease from the original value.
When the new value is more than double the original, the percent change exceeds 100%. For example, a value increasing from 10 to 25 is a 150% change.
Percent change is a relative comparison, while percentage points measure an absolute difference between two percentages. Going from 10% to 15% is a 5 percentage-point change but a 50% relative change.