Answer:
Let
The subset S is a subgroup of GL(n,R) if satisfies:
1. The identity matrix belong to S.
2. If A and B are in S then AB is in S.
3. If A is belong to S then belongs to S.
Let's see if S satisfies these conditions.
1. We know that , then .
2. Let A and B in S.
Then AB is in S.
3. Let , , then .
Since S satisfies all conditions then S is a subgroup of GL(n,R).
1.4286 :D :D :D :D hope this helps
Answer:
42.12cm²
Step-by-step explanation:
Firs well have to find the hypotenuse of the big and small right angled triangles because it is the length of the long and short diagonals which is needed in solving
The bigger triangle
Using Pythagoras theorem
let the length be x
x²=10²+6²
x²=100+36
x²=136
√x²=√136
x=√136
x=11.7m
The smaller triangle
Using Pythagoras theorem
let the length be y
y²=6²+4²
y²=36+16
y²=52
√y²=√52
y=√52
y=7.2
Now to find the total area of the shape which is a kite
Formula=
1/2 x D1 x D2
D1 is the long diagonal which is the hypotenuse of the bigger triangle and D2 is the shorter diagonal the hypotenuse of the smaller triangle
<h2>
<em>OladipoSeun</em><em>♡˖꒰ᵕ༚ᵕ⑅꒱</em></h2>
I don't know the options you were given, but I know that pi is a transcendental number. A transcendental number<span> is a </span>real<span> or </span>complex<span> number that is not </span>algebraic<span>—that is, it is not a </span>root<span> of a non-zero </span>polynomial equation<span> with </span>integer<span> (or, equivalently, </span>rational<span>) </span>coefficients<span>. The best-known transcendental numbers are </span>π<span> and </span>e<span>. Though only a few classes of transcendental numbers are known (in part because it can be extremely difficult to show that a given number is transcendental), transcendental numbers are not rare. Indeed, </span>almost all<span> real and complex numbers are transcendental, since the algebraic numbers are </span>countable<span> while the sets of real and complex numbers are both </span>uncountable<span>. All real transcendental numbers are </span>irrational<span>, since all rational numbers are algebraic. The </span>converse<span> is not true: not all irrational numbers are transcendental; e.g., the </span>square root of 2<span> is irrational but not a transcendental number, since it is a solution of the polynomial equation </span><span>x2 − 2 = 0</span><span>.</span>
Answer: if you have infinity points, which i will asume are the events, they cant have the same probability because then the probability will not be normalized, because in graph of prob vs variable, you will se infinite area under the curve if the probability is constant.
And yes, can all points have positive probability of occurring, but besides you medium value (the bell for example) you will see an asintotic decrease to the zero.