Question

E_11 [1] dham/AppData/Local/Microsoft/Windows/NetCache/IE/E90SD4LT/10)_REVISION_1_(GRADE_11][1].pdf A" à \( \mid \) Ask Copilot 10 of 11 CD ou may not have access to some features. View permissions d) \( 5^{2 K} \cdot 5^{3 K}=(25)^{5} \) e) \( 3^{9+10} \cdot 3^{5}=81 \) f) \( 4^{2 y-4}=8^{y} \) Search

          E_11 [1]
dham/AppData/Local/Microsoft/Windows/NetCache/IE/E90SD4LT/10)_REVISION_1_(GRADE_11][1].pdf
A" à \( \mid \) Ask Copilot
10
of 11
CD
ou may not have access to some features. View permissions
d) \( 5^{2 K} \cdot 5^{3 K}=(25)^{5} \)
e) \( 3^{9+10} \cdot 3^{5}=81 \)
f) \( 4^{2 y-4}=8^{y} \)
Search

E11 [1]
dham/AppData/Local/Microsoft/Windows/NetCache/IE/E90SD4LT/10)REVISION1(GRADE11][1].pdf
A" à | Ask Copilot
10
of 11
CD
ou may not have access to some features. View permissions
d) 5^2 K· 5^3 K=(25)^5
e) 3^9+10· 3^5=81
f) 4^2 y-4=8^y
Search

Added by Aaron M.

Calculus: Early Transcendentals

James Stewart 8th Edition

Instant Answer

Solved by Expert Madhur L

Step 1

Given: \(5^{2K} \cdot 5^{3K} = (25)^5\) Combine the exponents on the left side: \[5^{2K + 3K} = 5^{5K}\] Rewrite \(25\) as a power of \(5\): \[25 = 5^2\] So, \((25)^5 = (5^2)^5 = 5^{10}\) Equate the exponents: \[5K = 10\] Solve for \(K\): \[K = \frac{10}{5} Show more…

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E_11 [1] dham/AppData/Local/Microsoft/Windows/NetCache/IE/E90SD4LT/10)_REVISION_1_(GRADE_11][1].pdf A" à \( \mid \) Ask Copilot 10 of 11 CD ou may not have access to some features. View permissions d) \( 5^{2 K} \cdot 5^{3 K}=(25)^{5} \) e) \( 3^{9+10} \cdot 3^{5}=81 \) f) \( 4^{2 y-4}=8^{y} \) Search