What d'heck does "N of yea" mean?
Tara, you stated that you were able to get the [area of the] "big chunk of the shaded part." Well then, so share with us what area you got for that part.Hello Denis,
i was able to find the big chunk of shaded part but if u look carefully there is an isolated tiny part on the bottom of the figure if I m unable 2 get .. Plz help me find that.
Tara, you stated that you were able to get the [area of the] "big chunk of the shaded part." Well then, so share with us what area you got for that part.
Tara, your computations are approximations. Any type of this problem before that I have done wants the answer exact, including the use of the symbol for pi and/or square roots.Ok I 've got 51.43.. For that big shaded part..
Which is pretty easy..
I actually cut the area of square into half= 72
then figure out the ovals= quart - triangle n multiple 2= 20.57
next subtracted it 2 find the shaded chunk= 51.43
Tara, your computations are approximations. Any type of this problem before that I have done wants the answer exact, including the use of the symbol for pi and/or square roots.
Please spell out all of your words (or at least use standard abbreviations). In this case, please spell out the word "to" instead of using text speak.Half Area of square = 12*12=144/2= 72
next I need > > 2 < < find the 2 semi ovals in order > > 2 < < figure out the shaded c
chunk which is
quarter - triangle= (1/4*pie*6^2)-(1/2*6^2) then multiple by 2 as there is 2 semi 1/2 ovals across the figure= 20.57
next I minus > > 2 < < find the shaded chunk= 72-20.57= 51.43.
All I need now is > > 2 < < figure out the tiny part...
The diagram I gave is 1/4 of the total square (by area), so the side lengths of the smaller square are 1/2 that of the total.
Your result for the smaller shaded portion is too large. I agree with your result for the larger shaded area (at least closely), this area is the area of the square, minus a half-circle and a quarter of the square. Let's call the larger shaded area \(\displaystyle A_1\). I find:
\(\displaystyle A_1=12^2-\left(\frac{1}{2}\pi\cdot6^2+\frac{1}{4}12^2 \right)=108-18\pi\approx51.45\)
So, the given answer is incorrect, if I have interpreted the problem correctly.
Now, for the smaller shaded area \(\displaystyle A_2\), in the diagram I provided, you should see that the green triangle is equilateral, and the two red areas are circular sectors subtending an angle of \(\displaystyle \frac{\pi}{6}\).
What do you find?
Do you see how each side of the triangle is a radius of the circles?
And how the angles subtended by the two red circular sectors must then be \(\displaystyle \displaystyle \frac{\pi}{2}-\frac{\pi}{3}=\frac{\pi}{6}\)
So, use the fact that the area of the green triangle plus the area of the two red sectors plus the area of the gray portion (which you are seeking) add up to the area of the square, which is a quarter of the entire square.
Area of a triangle:
\(\displaystyle A=\dfrac{1}{2}ab\sin(C)\)
Area of a circular sector:
\(\displaystyle A=\dfrac{1}{2}r^2\theta\)
U = You
ur = your
plz = please
Start now using proper words: may be VERY important at job interviews
Hi MarkFL ,
The formulas that you had given me has not been taught to me..
this problem sum is currently for grade 6...
thank you for your help n time.
Have you been taught the Pythagorean theorem, and the formula for the area of a triangle:
\(\displaystyle A=\dfrac{1}{2}bh\)
Have you been taught the formula for the area of a circle:
\(\displaystyle A=\pi r^2\)
We can use these instead.