MHB Find f(a+b): $f(x)=\dfrac {2^x+2^{-x}}{2^x-2^{-x}}$

  • Thread starter Thread starter Albert1
  • Start date Start date
AI Thread Summary
To find f(a+b) given f(a) = 17/15 and f(b) = -65/63, the function f(x) can be rewritten using the identity f(x) = tanh(x). This leads to the equations tanh(a) = 17/15 and tanh(b) = -65/63. The sum of the hyperbolic tangents can be expressed as tanh(a+b) = (tanh(a) + tanh(b)) / (1 + tanh(a) * tanh(b)). Substituting the known values results in tanh(a+b) = (17/15 - 65/63) / (1 - (17/15)(-65/63)). The final result for f(a+b) can be calculated from this expression.
Albert1
Messages
1,221
Reaction score
0
$f(x)=\dfrac {2^x+2^{-x}}{2^x-2^{-x}},x\in R, x\neq 0$

$if$

$(1)f(a)=\dfrac{17}{15}$

$and$

$(2)f(b)=-\dfrac{65}{63}$

$find :f(a+b)$
 
Mathematics news on Phys.org
Albert said:
$f(x)=\dfrac {2^x+2^{-x}}{2^x-2^{-x}},x\in R, x\neq 0$

$if$

$(1)f(a)=\dfrac{17}{15}$

$and$

$(2)f(b)=-\dfrac{65}{63}$

$find :f(a+b)$

we have $f(a)=\frac {2^a+2^{-a}}{2^a-2^{-a}} = \frac{2^{2a}+1}{2^{2a}-1} = 1 + \frac{2}{2^{2a}-1} = 1 + \frac{2}{15}$
hence $2^{2a}-1 = 15$ or $a = 2$
we have $f(b)=\frac {2^b+2^{-b}}{2^b-2^{-b}} = \frac{1 + 2^{-2b}}{1 - 2^{-2b}} = \frac{-65}{63}$
or
$\frac{1 + 2^{-2b}}{2^{-2b}-1} = \frac{-65}{63}$ giving -2b = 6(same method as for a) or b = -3

so a + b = -1

so $f(a+b) = \frac{2^{-1} + 2^1}{2^{-1} - 2^1} = \frac{-5}{3}$
 
Albert said:
$f(x)=\dfrac {2^x+2^{-x}}{2^x-2^{-x}},x\in R, x\neq 0$

$if$

$(1)f(a)=\dfrac{17}{15}$

$and$

$(2)f(b)=-\dfrac{65}{63}$

$find :f(a+b)$

$f(a)=\dfrac{17}{15}$
$\dfrac {2^a+2^{-a}}{2^a-2^{-a}}=\dfrac{17}{15}$
$\dfrac {2^{2a}+1}{2^{2a}-1}=\dfrac{17}{15}$
$17(2^{2a}-1)=15(2^{2a}+1)$
$17\cdot2^{2a}-17=15\cdot2^2a+15$
$2\cdot2^{2a}=32$
$2^{2a}=16$
$2a=4$
$a=2$

$f(b)=-\dfrac{65}{63}$
$\dfrac {2^b+2^{-b}}{2^b-2^{-b}}=-\dfrac{65}{63}$
$\dfrac {2^{2b}+1}{2^{2b}-1}=-\dfrac{65}{63}$
$65(2^{2b}-1)=-63(2^{2b}+1)$
$65\cdot2^{2b}-65=-63\cdot2^2b-63$
$128\cdot2^{2b}=2$
$2^{2b}=\dfrac{2}{128}$
$2^{2b}=\dfrac{1}{64}$
$2^{2b}=2^{-6}$
$2b=-6$
$b=-3$

$f(a+b)=f(2-3)$
$f(a+b)=f(-1)$
$f(a+b)=\dfrac {2^{-1}+2^{1}}{2^{-1}-2^{1}}$
$f(a+b)=\dfrac {\frac{5}{2}}{-\frac{3}{2}}$
$f(a+b)=-\dfrac {5}{3}$
 
Last edited:

Thread 'What Exactly is Dirac’s Delta Function? - Insight'

Insights auto threads is broken atm, so I'm manually creating these for new Insight articles. In Dirac’s Principles of Quantum Mechanics published in 1930 he introduced a “convenient notation” he referred to as a “delta function” which he treated as a continuum analog to the discrete Kronecker delta. The Kronecker delta is simply the indexed components of the identity operator in matrix algebra Source: https://www.physicsforums.com/insights/what-exactly-is-diracs-delta-function/ by...
View full post »

Thread 'Non-orthogonal bases'

Suppose ,instead of the usual x,y coordinate system with an I basis vector along the x -axis and a corresponding j basis vector along the y-axis we instead have a different pair of basis vectors ,call them e and f along their respective axes. I have seen that this is an important subject in maths My question is what physical applications does such a model apply to? I am asking here because I have devoted quite a lot of time in the past to understanding convectors and the dual...
View full post »
Thread 'Imaginary Pythagoras'

Thread 'Imaginary Pythagoras'

I posted this in the Lame Math thread, but it's got me thinking. Is there any validity to this? Or is it really just a mathematical trick? Naively, I see that i2 + plus 12 does equal zero2. But does this have a meaning? I know one can treat the imaginary number line as just another axis like the reals, but does that mean this does represent a triangle in the complex plane with a hypotenuse of length zero? Ibix offered a rendering of the diagram using what I assume is matrix* notation...
View full post »

Similar threads

I ##x\lt y \lt z## positive integer numbers and if ##\dfrac 1x+\dfrac 1y+\dfrac 1z=\dfrac 13##
Replies
6
Views
1K
B Given an equation, find the value of this expression
Replies
17
Views
2K
MHB Finding $a$ and $b$ for $f(x)=|\lg (x+1)|$
Replies
3
Views
912
MHB 5.t.11 find x for the imaginary factors
Replies
2
Views
1K
MHB Solve $2\cos^2(x)=1$: Find $\theta$
Replies
7
Views
2K
MHB What is the Trigonometric Inequality for $0<x<\dfrac{\pi}{2}$?
Replies
1
Views
1K
MHB Is x+1 a Factor of the Polynomial x^3-5x^2+3x+1?
Replies
2
Views
1K
B Proof of Chain Rule: Understanding the Limits
Replies
3
Views
1K
MHB Graph of $y=\sin{x}-2$ on the domain $[0,2\pi]$
Replies
2
Views
1K
MHB No Real Zeroes of $x^6-x^5+x^4-x^3+x^2-x+\dfrac{3}{4}$
Replies
1
Views
1K

Hot Threads

Recent Insights

Back
Top