$${{\mathtt{10}}}^{{\mathtt{0.035}}} = {\mathtt{1.083\: \!926\: \!914\: \!021\: \!203\: \!5}}$$
gar12, mean is another word for average
thanks saseflower
Yea they are pretty cheap too. I wonder if they have 2 heads or something.
They say 2 heads are better than 1 - maybe they have only go a half a head.
Makes sense to me - thanks anon
Mmmm ....let's look at this one again, saseflower..
(1/3 ) / 9 =
(1/3) / (9/1) =
1/3 x 1/9 = 1/27
Remember, the reciprocal of 9 = 1/9 ...
(I gave you points for a good try, anyway)
https://www.youtube.com/watch?v=O8ezDEk3qCg
multiply by 100 and put a percent sign
For the x intercept put y=0 and solve
For the y intercept put x=0 and solve
$$\\log_x16=-2\\\\ 16=x^{-2}\\\\ \frac{1}{16}=x^{+2}\\\\ x=\frac{1}{4}$$
-2x^2+7x=10 subtract 10 from both sides
-2x^2 + 7x - 10 = 0
Note that b^2 - 4ac = 49 - (4)(-2)(-10) = 49 - 80 = -31
So......this polynomial has no real roots...!!!
saseflower, you have to put the 15a in brackets otherwise it is divide y 15 then multiply the answer by a.
Otherwise you answer is excellent - as it always is - thank you.:)
[2nd] [atan]
arc tan is the same as inverse tan.
The answer is 12
you have to multiply the 1x0 first
THEN add on all the other ones
30,28,12,and 14
(30 - 28)^2 - (14 - 12) =
(2^2) - (2) =
4 - 2 =
2
Move the point three places over in the direction to make the number smaller.
$$\underset{\,\,\,\,^{\textcolor[rgb]{0.66,0.66,0.66}{360^\circ}}}{{sin}}^{\!\!\mathtt{-1}}{\left({\mathtt{0.64}}\right)} = {\mathtt{39.791\: \!819\: \!499\: \!557^{\circ}}}$$
I entered asin(0.64)
We would have to know something else (like the length of the hypoteneuse, for instance) to find the sides.
On the web2 calc tan-1 is atan
arc tan is the same as inverse tan
they behave a bit like algebra. you can only add or subtract them if you have the same number under the square root sign
hey samhowell we can use this formula for that question bt ur formula is worong . bcz, we use b^2 -4ac bt u use b^2 -2ac so that answer is wrong.
It is the circumference of any circle divided by the diameter of that circle.
and it is approximately equal to 3.14159
