WebSo this is just going to be 16. And then we still have minus logarithm base 10 of 2. And now, using this last property, we know we have one logarithm minus another logarithm. This is going to be equal to log base 10 of 16 over 2, 16 divided by 2, which is the same thing as 8. So the right-hand side simplifies to log base 10 of 8. WebSolution Verified by Toppr Given log2=0.3010 and log3=0.4771 log12=log(4×3) =log4+log3 =log2 2+log3 =2log2+log3 Substituting the values =2×0.3010+0.4771 =0.602+0.4771 =1.0791 Was this answer helpful? 0 0 Similar questions If log2=0.3010 and log3=0.4771, then the value of log6 will be Easy View solution > Find out the value of n if 3 n=4 n−1 …
How do you condense 2log3 +3log2 - log6? Socratic
Web1. Add a comment. 3. I came up with what I believe to be an original formulation of proving that log a b is irrational. If log a b is rational, it is equal to some a / b, where a, b ∈ Z, … Web19 feb. 2024 · Q: The value of log 2 (log5 625) is: 16. Q: If log 2 [log3 (log 2 X) ] =1, then x is equal to: 17. Q: If log10 125 + log10 8 = x, then x is equal to : 18. Q: (log5 3) x (log3 625) equals : 19. Q: If log12 27 = a, then log6 16 is : 20. Q: The value of (log3 4) (log4 5) (log5 6) (log6 7) (log7 8) (log8 9) is: 21. robert guthrie gas station
4log2/log20-log3
Web1 jul. 2024 · asked Jul 1, 2024 in Mathematics by Taniska (64.8k points) Given that N = 7log49 900, A = 2log2 4 + 3log2 4 + 4log22 - 4log23 , D = (log5 49) (log7 125) Then answer the following questions : (Using the values of N, A, D) If logA D = a, then the value of log6 12 is (in terms of a) (A) (1 + 3a)/3a (B) (1 + 2a)/3a (C) (1 + 2a)/2a (D) (1 + 3a)/2a jee WebIf log12 27 = a, then log6 16is equal to 22. log7 log7 7 (7.17 is equal to log3 log 4 It If In (d) none of these Ina + In b then g + — is equal to (a) 7 (c) 1-3 2 23 If log x logy (a) xyz 24. log z then x y z is equal to a—b (b) abc is equal to (b) 3109 2 If log3 {5 + 4 log3 (x — 1)} = 2, then x is equal to (d) log2 16 If 2xlog4 3 + 310g4 x = 27, … WebIf log1227=a, then find the value of log616. Open in App. Solution. log616=log624=4log62=4log26. =4log22+log23=41+log23. and … robert guthrie obituary