(2 to the x - 1 power) divided by (2 to the 3 - 4x power) = 16, many don’t know where to start

1966 for me. In all the years since then, I never once needed to know how to do this. 😄

It's ok, algebra hasn't changed since then 😊

​@@ephraimgarrett4727Nice to be an American living a typical American life 😂

Yes easy Problem

Will take your advice. Will not go to college 😂

I got why.
I cannot make that transformation, because the expressions are not equivalent. It's a bit hard to explain, and I do not feel capable of doing it.
Let's just say that 2^3 is not the same as "". It needs to apply to both sides
example
2^3 = 8
so
3 . log(2) = log (8)
which is a subtle difference :)

​@@luisPcordeirowhy would you want to use log in the first place

When dividing exponents with the same base, you subtract the exponents. Thus, x-1- (3-4x) . Distributing the negative, you get -3+4x.

@orangebetsy3404
First, just to be mathematically clear, it’s 2^[(8/5) - 1], and, 2^[3 - 4(8/5)]. And we’re not raising 2 to the 8/5 power! 8/5 is simply the answer for x.
To check our answer for correctness by substituting our answer, 8/5, back into our equation what we are really doing, and must do, is raising 2 to the power of what results from the calculation done within the parentheses. We’re not raising 2 to the 8/5 power! Careful!
But more to your fundamental question, as you know, decimals and percentages are fractions, just in different get ups, and all, sort of speak, and vice versa, lol. So decimal powers are in essence and affect fractional powers. And, so, fractional or decimal powers are simply, what I call, don’t know if anyone else does, radical powers. “…what’s a radical power..!” This symbol, √, is called the radical. The radical is just another name for taking a specific root of a number, or for taking a specific root of a base, if you will (the two terms, number and base, are used interchangeably), such as, the square root, the cube root, the sixth root, etc., of a number. The base, or any expression beneath the radical symbol is called the “radicand.” The radical for the cube root of some number, or some base, if you will, will have a 3 written above and inside the little v shaped portion on the lower left side of the radical symbol. The 3, or root, is called the “index.” So, the radical symbol for the 6th root of some base (“radicand”) will have 6 written in along with the radical symbol. And so on and so forth for all the other roots, or “indexes,” taken of numbers, or bases, or “radicands,” if you will. But the square root radical symbol is the only exception to that rule. The square root radical symbol has an “index” 2, but the 2 is never written in along with the radical symbol but is always understood and accepted to be there, nonetheless. So only it alone, the square root radical symbol, looks like this, √, all the time.. never no 2! So… for instance, hopefully now that that’s settled, for the 5th root of a base the radical symbol will have its “index” 5 along with it, and likewise for all the other roots with respect to their “indexes,” again, except for the index 2 for square root of a number. For the 19th root of a number, for instance, 19 will be the “index” written in along with the radical symbol.

@orangebetsy3404
So… now, to answer your question, when we take the square root of some number, we’re in effect raising that number to the power of 1/2! Which by another name and method we simply call raising some number to some power, or, doing exponents! So, in doing 2^1.6, or 2^(8/5), we’re still simply doing exponents, inherently! Just can’t do them the traditional way, as done when doing “normal” exponents, lol. For example, The √ 4 = 4^(1/2). Which simply means the square root of 4 raised to the power of 1, or, the square root of 4 raised to the 1st power! The missing “index” 2 being understood as being there without writing it. The missing 2 in the index notation is simply the accepted and agreed upon convention for expressing the square root of a number. Careful though! The “radicand”, or the base, which is the same thing, if you will, must always be raised to the specified power attached to it before taking the root of the result of that calculation! Next, for the √4, for example, √4 = 4^(1/2). The numerator 1 of the fractional exponent is the power to which the base is to be raised, and denominator 2, the “index,” is the root we’re taking of the base! It would look like this in long hand, √(4^1), with the missing “index” 2 being understood as being with the radical symbol, or, it’s implied, sort of speak. So, we have the square root of 4 raised to the power 1, or, 4^(1/2)! In other words, first raise the base to the power specified by the numerator of the fractional exponent, then take the root, as specified by the denominator, of that result ! Likewise for all other powers and roots.

@orangebetst3404
So, for your 2^1.6 or 2^(8/5), we’d simply take the 5th root of 2 [(5), the denominator, is the root!] raised to the 8th power [(8), the numerator, is the power 2 is to be raised to!]. Or better and even safer yet, and more properly and correctly, we “must always” “first” raise 2, the base, or the “radicand,” pick your poison, to 8th power, then we take the 5th root of that result! And that’s it! After all, you must remember, decimals and percentages are simply fractions in another form, or outfit, and vice versa! But… try it on your calculator. Raise 2 to the 8th power, then take the 5th root of that result, and you should get 3.03143, rounded to 5 decimal places, for your answer. But that particular answer will just be the result and answer for your particular question of how to raise 2 to the 8/5 power, or how to raise a base to a fractional power. That result won’t be the answer to the problem the instructor presents here, of course. But you must make the inputs into your calculator properly or you’ll get a wrong answer, or an error message! But just know and remember that when doing bases raised to decimal powers the decimal must first be changed to a fraction to put the terms of the expression into their fractional form in order to “first” raise the base to the power specified by the numerator, then take the root of the base as specified by the denominator. Otherwise, if our fractional power remains in decimal form.. well… that’s then one reason why we have logarithms and exponentials and logarithm and exponential tables and slide rules, etc.… and calculators!
Hope that helps more than it hurts…? …and hope you’re not winded after such a long wind….?

@orangebetsy3404
…on second thought, and my apologies, guess I could’ve simply said, in a word or two, without all the long-winded foundational and fundamental preliminaries, simply change the base’s exponent, which is expressed in decimal notation, to a fraction, and from there the numerator is the power to which the base “must first” be raised before taking the root, and the denominator is the root to be taken of that result….? For another example, x^(0.27) ≈ X^(3/11) = the 11th root of x to the 3rd power, but more correctly, the 11th root of x after x has been raised to the 3rd power, and not before that step… and you’re done! Again, the √25 = 25^(1/2). 2 is the root to be taken of 25, and 1 is the power to which 25 must first be raised before taking the root!

8/5