Oh, dude, I see what you did there! You're mixing numbers and letters, trying to throw me off, huh? Well, if we follow the pattern, the next value should be "7" because we're just counting up in a weird, mixed-up way. So, like, there you go, 7 is the next value.
1I2L3F4
You add two then take one. 1+2=3, 3-1=2, 2+2=4, 4-1=3. The next number is 5.
2,3
The pattern is +2 /2 +3 /3 +4 /4, and the next term would be +5, or 8.
2(x2=) 4 3(x3=) 9 4(x4=)16 the next numbers are 16 5 25 6 36
the next number will be 2 3 4 3 4 2 2 .............
1I2L3F4
To determine the next value in the sequence 2, 3, E, 4, 5, 1, 6, 8, we can analyze the pattern. It appears that the sequence alternates between numbers and the letter "E," which could represent "even." Following this pattern, after the last number (8), the next value could likely be "E," suggesting a return to the letter. Thus, the next value is "E."
You add two then take one. 1+2=3, 3-1=2, 2+2=4, 4-1=3. The next number is 5.
If you mean: (4-2)-(3*4) then it is -10
The next number in the series 2-4-3-9-4 is 16. 2 squared is 4, 3 squared is 9, 4 squared is 16
The value of 3 is 300.
To find the value of (-3mn + 4m - 3) when (m = 2) and (n = -4), substitute the values into the expression: (-3(2)(-4) + 4(2) - 3). Calculating this gives: (-3(-8) + 8 - 3 = 24 + 8 - 3 = 29). Thus, the value is (29).
-3x - 2 = -6 -3x = -6 + 2 -3x = -4 -x = -4/3 x = 4/3 The absolute value is therefore 4/3.
4646564
Just stick it right next to it. 2 + 3/4 = 2 and 3/4
The value of ( \frac{3^2}{3^4} ) can be simplified using the property of exponents that states ( \frac{a^m}{a^n} = a^{m-n} ). Therefore, ( \frac{3^2}{3^4} = 3^{2-4} = 3^{-2} ). This can be further expressed as ( \frac{1}{3^2} ), which equals ( \frac{1}{9} ). Thus, the final value is ( \frac{1}{9} ).