What is the logarithm of LG with base 2 and base 4?
two
RELATED INFORMATIONS
- 1. Let 0 < a < 1 and f (x) = log logarithm with a as the base (a ^ 2x-2a ^ X-2), then f (x) < the value range of X X X
- 2. Find the value range of X in log (2-x) (x + 3) Is based on (2-x)
- 3. How can the logarithm with root 3 minus root 2 as the base 5 be transformed into the logarithm with root 3 plus root 2 as the base 1 / 5?
- 4. 1. The logarithm of 7 / 48 with 2 as the radical + the logarithm of 12 with 2 as the base minus the logarithm of 42 with 2 as the base 2. (logarithm of base 2 with 3 + logarithm of base 2 with 9) times (logarithm of base 3 with 4 + logarithm of base 3 with 8)
- 5. Do not calculate the size of the 5th power of 4 compared with the 4th power of 5 by logarithm or exponent
- 6. X = - 1 power of (logarithm of 1 / 2 as the base 1 / 3) + - 1 power of (logarithm of 1 / 5 as the base 1 / 3), then x belongs to the interval? A.(-2,-1) B.(1,2) C.(-3,-2) D(2,3)
- 7. Calculation: 2log510 + log50.25=______
- 8. 2log5 10+log5 0.25=?
- 9. Solve 2 (log5) 10 + (log5) 0.25 Trouble
- 10. The power of (1 / 16) is 0.75-2log5, the power of (1 / 16) is 10-log5 and the power of (1 / 16) is 0.25
- 11. -What is the logarithm of LG with the base of 0.0000000000002
- 12. Four times the logarithm of three with LG as the base
- 13. Solving logarithm equation: lgY = (lg0.4 / lg0.5) lgx + lg0.5 Reduced to the format of y = how much x
- 14. Why is the logarithm of LG's 0.00001 equal to - 5?
- 15. Known LG2 = a, Lg3 = B, try a, B for the following logarithm (fast! Thank you! lg(6) log3(4) log2(12) lg(3/2) It's true in brackets
- 16. It is known that LG2 = a, Lg3 = B is expressed as LG18 / 25 by a, B
- 17. It is known that LG2 = A and Lg3 = B. try to use a and B to express the logarithm with 5 as the lower 12
- 18. What does LG ^ 2 (3) mean? I mean the logarithm of 3 of LG ^ 2 with the base of 10
- 19. What's the logarithm 10log2^2n+10log3/2=6n+1.8 That's what it says in the book. I majored in communication, but this mathematical problem should not affect the solution What is the ratio of output signal to noise? Then: [S / DQ] DB = 10log3 / 2 (2 ^ 2n) = 10log2 ^ 2n + 10log3 / 2 = 6N + 1.8 [DB]
- 20. How to multiply two logarithms of the same base