Calculate the new value after a percentage decrease, find the percent decrease between two values, reverse-calculate the original value, or model compound decay. Decay table, half-life indicator, v...
The **Percentage Decrease Calculator** helps you work with percentage decreases — the counterpart of percentage increases and one of the most common operations in finance, science, and everyday math. Use it whenever you need to lower a value by a given percent, determine how much something dropped, find the original amount before a known reduction, or project compound decreases over multiple periods.
Four calculation modes cover every scenario. **"Find new value after % decrease"** applies a percentage reduction to a starting number — e.g., $500 minus 20% gives $400. **"Find the % decrease"** does the reverse: given the original and new values, it tells you the percentage it dropped. **"Find original value"** back-calculates the starting amount when you know the result and the percentage that was applied. **"Compound decreases (decay)"** projects repeated percentage losses over time — crucial for depreciation, radioactive decay, drug half-life calculations, and population decline models.
Six output cards show the original value, new value, decrease amount, percent decrease, multiplier, and the half-life in periods (how many repetitions until only 50% remains). A bar visualizes the remaining portion versus the lost portion. The **decay table** lists every period with the per-period loss, cumulative percentage lost, and a remaining-value bar — perfect for understanding exponential decay. A collapsible **quick reference table** shows results for 11 standard decrease percentages along with half-life figures, so you can compare scenarios at a glance.
Preset buttons cover common situations like price markdowns, depreciation schedules, and multi-period decay, letting you explore the calculator without typing.
Percentage decrease questions come up in many different forms: markdowns, depreciation, budget cuts, inventory loss, shrinking populations, and exponential decay over time. The arithmetic is easy to mix up because some problems ask for the new value, some ask for the percent that changed, and others ask you to reconstruct the original value before the decrease happened.
This calculator is useful because it handles those different cases without forcing you to rewrite the problem manually each time. You can reduce a starting amount by a known rate, measure the percent drop between two values, work backward to the original amount, or project repeated decreases across multiple periods. The decay table and half-life output are especially valuable when you need to see how a constant rate compounds instead of assuming the same absolute amount disappears every time.
New = Original × (1 − pct/100). % Decrease = (Original − New) / Original × 100. Original = New / (1 − pct/100). Compound: Original × (1 − pct/100)^n. Half-life = ln(2) / ln(1 / (1 − rate)).
Result: A 20% decrease on 500 gives a new value of 400, with a decrease amount of 100 and a multiplier of 0.80.
Convert 20% to 0.20, subtract that from 1 to get the remaining multiplier 0.80, then multiply 500 by 0.80. The result is 400, so the drop is 100.
A one-time percentage decrease reduces a value once. If a price drops 20% from $500, the result is $400. Compound decrease is different because the same rate is applied again and again to a shrinking base. That is how depreciation schedules, radioactive decay, and recurring loss models behave. The result is not linear, which is why the per-period table matters when you want to understand what happens over time.
Many real questions start with the reduced value, not the original one. If a product now costs $85 after a 15% decrease, the original price was not $100 by coincidence of rough estimation; it must be solved by dividing the remaining amount by the remaining proportion. Working backward correctly is useful in auditing, pricing analysis, and report checking because it lets you recover the baseline from the observed result.
The half-life output translates a decrease rate into a more intuitive benchmark: how long it takes for repeated decreases to reduce a quantity to half its starting value. The decay table then shows each period's remaining amount, period loss, and cumulative percentage lost. Together, those views help you understand whether a rate is mild, aggressive, or unrealistic for the scenario you are modeling.
Percentage decrease = ((Old Value − New Value) / Old Value) × 100. For example, dropping from 80 to 60 is ((80−60)/80) × 100 = 25% decrease.
No. A value can decrease by at most 100% (to zero). Negative values represent a different concept than a percentage decrease.
Common uses include markdown pricing, revenue declines, inventory shrink, depreciation schedules, and any report that compares an original amount with a smaller final amount. It is the standard way to express a drop relative to where you started.
Divide the final value by (1 − decrease/100). If a price after a 20% decrease is $80, the original price was $80 / 0.80 = $100.
Each percentage decrease applies to the value remaining after the previous decrease, not to the original. Two successive 10% decreases reduce the value to 81% of the original, not 80%.
A percentage decrease is bounded at 100%, which reduces any positive value to zero. Decreases beyond 100% would produce negative results, which have no meaningful interpretation in most contexts.