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Limits & Continuity
AP Calculus AB · Unit 1: Limits
⛶ Fullscreen
FUNCTION:
Removable
Jump
Infinite
Continuous
Oscillating
x →
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lim⁻
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lim⁺
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f(a)
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Continuous?
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Approach point a
2.0
Zoom (x-range)
10
Approach delta δ
0.50
Shows ε–δ neighborhood
Function
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lim (x→a⁻)
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lim (x→a⁺)
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Two-sided limit
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f(a) defined?
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Continuous at a?
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📝 Quick Quiz
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1. For a two-sided limit lim(x→a) f(x) to exist, which must be true?
f(a) must be defined
Left and right limits must be equal
f(a) must equal the limit
The function must be continuous
2. A removable discontinuity means:
The limit does not exist at that point
The limit exists but f(a) ≠ limit (or undefined)
The function has a vertical asymptote
Left and right limits differ
3. For f to be continuous at x = a, which THREE conditions must hold?
f(a) defined, lim exists, lim = f(a)
f(a) defined, f is differentiable, f is integrable
f(a) > 0, lim > 0, they are equal
Limit exists from left only
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