Investigate limℎ→0 1−cosℎ/ℎ2 numerically (and graphically if you have a graphing utility). Then prove that the limit is equal to 12.

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Bradford T. · Accepted Answer

From the graph, the limit equals 1/2Proof:limh→0(1-cos h)/h2 = limh→0((1-cos h)/h2)(1+cos h)/(1+cos h)= limh→0(1-cos2 h)/h2 (1/(1+cos h)) = limh→0(sin(h)/h)2limh→0(1/(1+cos h))=(1)2(1/(1+1)) = 1/2

Investigate limℎ→0 1−cosℎ/ℎ2 numerically (and graphically if you have a graphing utility). Then prove that the limit is equal to 12.

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Investigate limℎ→0 1−cosℎ/ℎ2 numerically (and graphically if you have a graphing utility). Then prove that the limit is equal to 12.

1 Expert Answer

Still looking for help? Get the right answer, fast.

OR

RELATED TOPICS

RELATED QUESTIONS

CAN I SUBMIT A MATH EQUATION I'M HAVING PROBLEMS WITH?

If i have rational function and it has a numerator that can be factored and the denominator is already factored out would I simplify by factoring the numerator?

how do i find where a function is discontinuous if the bottom part of the function has been factored out?

find the limit as it approaches -3 in the equation (6x+9)/x^4+6x^3+9x^2

prove addition form for coshx

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