Given a function f(x) which is continuous on an interval [a,b] & differentiable on its inter
![Given a function f(x) which is continuous on an interval [a,b] & differentiable on its inter](https://64.media.tumblr.com/e263fef01b02b3ac1bc4901546551549/5acb0390c3bf9735-66/s640x960/838c51c703ed358ae2a0a5b59653ee010dfcceda.gif "Given a function f(x) which is continuous on an interval [a,b] & differentiable on its inter")
![Given a function f(x) which is continuous on an interval [a,b] & differentiable on its inter](https://64.media.tumblr.com/9310513bdfbfbecdcf8255a686fc307a/5acb0390c3bf9735-49/s640x960/5c0429edf05618d3fe0c7a95c453507d3b1f6eac.gif "Given a function f(x) which is continuous on an interval [a,b] & differentiable on its inter")
Given a function f(x) which is continuous on an interval [a,b] & differentiable on its interior, the Mean Value Theorem guarantees there exists a value c in that interval such that the line tangent to the function when x = c is parallel to the line drawn between ( a , f(a) ) and ( b, f(b) ). (GIF Description: A function f(x) is plotted from x = a to b, and a red line is drawn b/w its endpoints at ( a , f(a) ) & ( b , f(b) ). A point tracing f(x) carries a compass that records the tangent’s slope relative to the red line. When their slopes are equal, x is labeled c. In the first GIF, the function has a single maxima. In the second GIF, the function has multiple extrema.) -- source link
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