Concept module
Move one upper bound across a source curve and watch signed area build into a running total so accumulation stays visual instead of symbolic.
Interactive lab
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Starter track
Step 6 of 60 / 6 completeEarlier steps still set up Integral as Accumulation / Area.
Previous step: Limits and Continuity / Approaching a Value.
Why it behaves this way
An integral becomes easier to trust when it behaves like a running total instead of a mysterious antiderivative symbol. This module keeps one source curve, one movable upper bound, and the signed area from 0 to x visible together so accumulation feels like a changing quantity you can watch.
The most important distinction is that the source height is local while the accumulated amount is total. A point on the source curve tells you how fast the total is changing right now, but the accumulation graph records everything that has already been gathered from the start up to the current bound.
Key ideas
Frozen walkthrough
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View plans1.6
1. Read the active bound on the source graph
2. Read the matching point on the accumulation graph
3. Connect the local slope to the source height
Current accumulated amount
Common misconception
If the source height is large at a point, then the accumulated amount must be large for the same x-value.
The source height is only the current vertical value on the original graph.
The accumulated amount is a running total of everything gathered from 0 up to that bound, so it can stay large even when the current height is small or negative.
Mini challenge
Make a prediction before you reveal the next step.
Check your reasoning against the live bench.
Quick test
Graph reading
Question 1 of 3
Use the live bench to test the result before moving on.
Accessibility
The simulation shows a source curve on a coordinate plane with a draggable upper-bound point. Signed area from 0 to that bound is shaded directly on the source graph, and a second smaller graph shows the matching accumulated amount A(x).
Moving the bound updates the source height, the signed area, and the accumulation point together so the learner can compare the local source value with the running total.
Graph summary
The source-function graph shows the current height that controls whether new area adds or subtracts. The accumulation graph shows the running total built from that signed area.
The two graphs are linked point-for-point: the x-value matches across both, and the local slope of the accumulation graph matches the source height.
Keep the calculus branch moving
Open the next concept, route, or track only when you want the current model to widen into a larger branch.
Combine, subtract, and scale vectors on one plane so magnitude, direction, and components stay tied to the same live object.
Move one rectangle width under a fixed perimeter, watch the area curve peak, and use the local slope to see why the square is the best constrained shape.
Approach one target point from the left and right, compare the limiting height with the actual function value, and contrast continuous, removable, jump, and blow-up behavior on one honest graph.