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Exponential function
As a last topic in this section we have to discuss a special exponential function. Actually this is so special that for several people it is THE exponential function. Following it is,
f( x ) = ex
where e = 2.718281828...... . Note the difference among f( x )= b x and f( x ) = ex . In the primary case b is any number which is meets the limitation given above whereas e is a very specific number. Also note that e is not a terminating decimal.
This special exponential function is extremely important & arises obviously in several areas. As noted above, this function arises so frequently that several people will think of this function if you talk regarding exponential functions. Let's get a quick graph of this function.
Example Solve out the following system of equations. x 2 + y 2 = 10 2 x + y = 1 Solution In linear systems we had the alternative of using either method on any gi
39+(-88)-29-(-83)
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How would I solve the reflection of y= (-x)^2
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what is 3x+2 over 4 = 2
so I''m having trouble. I honestly don''t under stand this. Y=4x+5. y=-1/4x+4 they want me to tell whether the line is parallel, perpendicular or neither I don''t know how.
Based on past experience, a production process requires 15 hours of direct labour and 2 assemblers for every $450 of raw materials. If the company has budgeted for $33,750 worth of
Inequalities Involving > and ≥ Once again let's begin along a simple number example. p ≥ 4 It says that whatever p i
Sketch the graph of f( x ) = e x . Solution Let's build up first a table of values for this function. x
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