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Two different word phrases for the expression t divided by 30 can be said to be t/30.
It is: t/82
T divided by 30 30 times another number equals T
no it equals 20, yes it equals 2 you illiterate piece of sh*t
4 x 7 56/2
To simplify the expression (\frac{3\sqrt{t^4}}{6\sqrt{t^4}}), first simplify the coefficients and the square roots. The coefficients (\frac{3}{6}) simplify to (\frac{1}{2}). Since (\sqrt{t^4} = t^2), you can rewrite the expression as (\frac{1}{2} \cdot \frac{t^2}{t^2}). Since (\frac{t^2}{t^2} = 1), the final simplified expression is (\frac{1}{2}).
Two different word phrases for the expression t divided by 30 can be said to be t/30.
It is: t/82
To simplify the expression (\frac{3 \sqrt{t^4}}{6 \sqrt{t^4}}), first note that (\sqrt{t^4} = t^2). This allows us to rewrite the expression as (\frac{3t^2}{6t^2}). Since (t^2) is common in both the numerator and denominator, it cancels out, resulting in (\frac{3}{6}), which simplifies to (\frac{1}{2}). Thus, the final simplified expression is (\frac{1}{2}).
The answer would be the sum of (t) plus (w) divided by 2: (t + w) /2
T divided by 30 30 times another number equals T
vd/t in science means velocity (speed) multiplied by distance traveled divided by time taken.
g(t) = 2/tThe function is the same as writing g(t) = 2 t-1,and that's not too difficult to differentiate:g'(t) = -2 t-2g'(1/2) = -2 (1/2)-2 = -2 (4) = -8
The expression (12t^3 - 48t) can be factored by taking out the greatest common factor, which is (12t). This gives us (12t(t^2 - 4)). Further factoring (t^2 - 4) using the difference of squares results in (12t(t - 2)(t + 2)). Thus, the completely factored form is (12t(t - 2)(t + 2)).
no it equals 20, yes it equals 2 you illiterate piece of sh*t
(4t2 - 16)/8 ÷ (t - 2)/6 = [4(t2 - 4)/8] x 6/(t - 2) = (t2 - 22)/2 x 6/(t - 2) = (6/2)[(t + 2)(t - 2)/(t - 2)] = 3(t + 2) = 3t + 6
The expression (4^T) is equivalent to (4) raised to the power of (T), while (4^{-T}) is equivalent to the reciprocal, or (\frac{1}{4^T}). Therefore, the two expressions can be related as (4^T) and \frac{1}{4^T}). Together, they represent a pair of values that are inverses of each other.