Help! I keep mixing up index rules (do I add exponents here or not?)

I’m trying to befriend index notation (aka powers), but the little superscript hats keep swapping places when I’m not looking. I think I’ve invented a bogus rule and now I can’t unsee it.

Here’s where my brain does a somersault: when I see something like 3^2 × 5^2, I instinctively try to smoosh it into 3^(2+2). But then another part of me whispers, “Wait, isn’t it also (3×5)^2?” and those two ideas don’t match. So… which universe is real?

Some context for my powers saga:
– I’m pretty sure about this one: 2^3 × 2^4 = 2^(3+4). That feels fine because the base is the same.
– But then for 10^2 + 10^3, my mischievous brain tries to make it 10^(2+3). Yet 100 + 1000 definitely doesn’t look like 10^5, so clearly that shortcut is garbage.
– And with division, I did 8^2 ÷ 4^2 and tried the “subtract the exponents” thing on the 8, getting 8^(2−2) = 8^0, which seems super suspicious. Another voice says maybe it should be (8/4)^2 instead?

I think my incorrect assumption is: “If anything shares a 2 in the air, I can drag the 2 around and do whatever I want.” That feels… illegal.

Could someone help me untangle which rules go with:
– same base vs. same exponent,
– multiplying vs. adding expressions with powers,
– and how to spot when I’m about to do a forbidden exponent move?

If it helps, a simple example walk-through with 3^2 × 5^2 and 10^2 + 10^3 would probably reveal where my hat-tricks are going wrong. I’d love a memory-friendly way to keep these rules straight!

One Response

  1. The index rules split cleanly into two families, and they only apply to multiplication or division, not to addition. Same base: a^m × a^n = a^(m+n) and a^m ÷ a^n = a^(m−n) (a ≠ 0), so 2^3 × 2^4 = 2^7 is fine, but you cannot use this when the bases differ. Same exponent: a^k × b^k = (ab)^k and a^k ÷ b^k = (a/b)^k, so 3^2 × 5^2 = (3×5)^2 = 15^2, and 8^2 ÷ 4^2 = (8/4)^2 = 2^2 = 4. Notice 3^2 × 5^2 is not 3^(2+2), because adding exponents needs the same base. With addition there is no combining rule: 10^2 + 10^3 ≠ 10^5; the best you can do is factor a common power, 10^2 + 10^3 = 10^2(1 + 10) = 1100. A small analogy: think of exponents as hats stuck to their own base-hats can stack on the same person when you multiply the same base, or a group wearing the same hat can stand under one big hat when you multiply or divide them, but hats never jump across a plus sign. To spot illegal moves, watch for (i) trying to move an exponent across + or −, (ii) adding or subtracting exponents when the bases aren’t the same, and (iii) mixing the two families. Quick checklist: multiply same base → add exponents; divide same base → subtract exponents; multiply/divide same exponent → combine bases and keep the exponent; addition/subtraction → only factor, never fuse.

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