Cos(-pi/4) & Sec(pi/4): What's the Difference?

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Discussion Overview

The discussion revolves around the mathematical relationships involving the cosine function, specifically comparing the values of cos(-π/4) and sec(π/4), and clarifying the distinction between the reciprocal of cosine and its inverse.

Discussion Character

  • Technical explanation
  • Conceptual clarification
  • Debate/contested

Main Points Raised

  • Some participants assert that 1/cos(π/4) equals sec(π/4), which is generally accepted as correct.
  • One participant questions the equivalence of 1/cos(π/4) and cos(-π/4), suggesting that this is correct due to the symmetry of the cosine function.
  • Another participant emphasizes that cos(-π/4) equals cos(π/4) because the cosine function is even, but disputes the claim that 1/cos(π/4) equals cos(-π/4).
  • There is a clarification regarding the terminology, noting that the inverse of cosine is arccos, which differs from the reciprocal 1/cos.

Areas of Agreement / Disagreement

Participants generally agree that 1/cos(π/4) equals sec(π/4). However, there is disagreement regarding the relationship between 1/cos(π/4) and cos(-π/4), with some asserting they are equal and others contesting this claim.

Contextual Notes

Participants discuss the properties of the cosine function, including its evenness and symmetry, but do not resolve the disagreement regarding the specific relationships between the expressions discussed.

ryanuser
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Why 1 divided by cos(pi/4)=cos(-pi/4)?
Is it wrong to say 1/cos(pi/4)=sec(pi/4)?

Thanks
 
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Hi ryan:

Is it wrong to say 1/cos(pi/4)=sec(pi/4)?​
1/cos(pi/4)=sec(pi/4) is correct.

Why 1 divided by cos(pi/4)=cos(-pi/4)?​
I think you are asking: Why is the following correct?
1/cos(pi/4) = 1/cos(-pi/4)?​
If this is what you are asking, the reason that is correct is because
cos(pi/4) = cos(-pi/4),​
which is because
the cos function is symmetrical,​
and because
the reciprocal of two equal numbers will be equal.​

I hope this is helpful.

BTW: The title of the thread does not match your question. The inverse of the cos is the arccos, which is not the same as the reciprocal, 1/cos.

Regards,
Buzz
 
Last edited:
Thanks you
 
Buzz Bloom said:
BTW: The title of the thread does not match your question. The inverse of the cos is the arccos, which is not the same as the reciprocal, 1/cos.
The thread title is now "Reciprocal of cos".
 
Hello,

1/cos(pi/4) is not equal to cos(-pi/4). Cos(-pi/4) is equal to cos(pi/4). It is because cos function is an even function and it produces same answer to negative and positive values. I can give you a simple reason that 0 and 2pi is same in angles and 0-pi/4 is same as 2pi-pi/4 if you see graph paper, rotate a line from positive X-axis in anti-clock wise direction it lies in fourth quadrant. Now, you see x co-ordinate is positive and hypotenuse is length so it's positive. Hence, base/hypotenuse is positive.

I hope this one helps and if any other query regarding my answer please ask.
 

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