A bicycle lock requires a two-digit code of numbers 1 through 9, and any digit may be used only once. Which expression would determine the probability that both digits are even?

Answers

Answer 1

Answer:

The expression which would determine the probability that both digits are even which is required for bicycle lock is (4P1)(3P1)/(9P2).

What do you understand by the term permutation?

The permutation is the arrangement of the things or object in a systematic order, in all the possible ways. The order of arrangement in permutation is in linear.

A bicycle lock requires a two-digit code of numbers 1 through 9, and any digit may be used only once. The probability of choosing 2 digits from 9 is,

$^9P_2$

There are total 4 even numbers {2,4,6,8}. The probability of choosing first digit's even from 4 even numbers is,

$^4P_1$

For the second digit to be even is,

$^3P_1$

Thus, the favorable outcome is, $(^4P_1)(^3P_1)$ and total outcome is $^9P_2$ . Thus, the expression which would determine the probability that both digits are even is,

$P=((^4P_1)(^3P_1))/(^9P_2)$

Thus, the expression which would determine the probability that both digits are even which is required for bicycle lock is (4P1)(3P1)/(9P2).

Learn more about the permutations here;

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Answer 2

Answer:

The correct answer is:

A. P(both even) = $((_(4)P_(1))(_(3)P_(1)))/(_(9)P_(2))$

The expression would determine the probability that both digits are even.

$|Huntrw6|$

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The resultant force, R, is related to two concurrent forces, X and Y, acting at right angles to one another, by the formula R2=X2+Y2. Rewrite the formula for Y.

Answers

R^2 = X^2 + Y^2
Y^2 = R^2 - X^2
Y = sqrt(R^2 - X^2)

Answer:

Y = √(R² - X²)

Step-by-step explanation:

A universal set contains only sets A and B. If A∩B = Ø and A and B are not the empty set, then all of the following are true except ______. A and B are disjoint.

A is equal to B complement.

A∪B={}

A is not a subset of B.

Answers

If A∩B = Ø and A and B are not the empty set, all of the following are true except Option 3

What is an empty set?

That set which doesn't contain any value is called empty set. This is also called as null set or void set. This is denoted by Ø or { }

We have given A∩B = Ø

Case1:

If A∩B = Ø and A and B are not the empty set, A and B are non empty set which means A and B are disjoint.

Hence, Option 1 is correct.

Case2:

If there intersection is empty means there is nothing common. Hence, Option 2 is correct.

Case3:

A and B are non-empty sets means their union can not be empty.

Hence, option 3 is incorrect.

Case4:

A can't be subset of B because Subset is the same elements in B of A which is not possible because their intersection is empty.

Hence, Option 4 is correct.

Therefore, If A∩B = Ø and A and B are not the empty set, all of the following are true except Option 3.

Learn more about set here:

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Answer:

Option 3

Step-by-step explanation:

We have give $A\capB=\phi$

Case1:

A and B are non empty set which means A and B are disjoint

Hence, Option 1 is correct.

Case2:

When there intersection is empty means there is nothing common

Hence, A is not of B or A is equal to complement of B

Hence, Option 2 is correct.

Case3:

A and B are non-empty sets means their union can not be empty

Hence, option 3 is incorrect.

Case4:

A can not be subset of B because Subset is the same elements in B of A which is not possible because their intersection is empty

Hence, Option 4 is correct.

We have to choose false statement

Therefore, Option 3

A sheet of glass has a density of 2.5 g/cm3what is the density of the glass in? kg/m3

PLEASE HELP!!!!!!!!

Answers

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Which is the standard form of the equation of the parabola that has a vertex of (3, 1) and a directrix of x = –2?a) (x-3)^2 = 20(y-1)
b) (y-1)^2 = 20(x-3)
c) (y-1)^2 = -20(x-3)
d) (x-3)^2 = 20(y-1)

Answers

Answer with Step-by-step explanation:

We have to find:

the standard form of the equation of the parabola that has a vertex of (3, 1) and a directrix of x = –2

General form of Parabola that opens left or right:

(y−k)²=4p(x−h)

Vertex =(h,k)

Directrix: x=h−p

Here, h=3,k=1 and h-p=-2 i.e. p=h+2=5

Hence, equation of parabola in this case equals

(y-1)²=4×5(x-3)

i.e. (y-1)²=20(x-3)

Hence, correct option is:

b) (y-1)²=20(x-3)

Hello,

Remenber:
if S=(0,0) y²=2px then F=(p/2,0 and d:x=-p/2

Let's pose
x'=x-3
y'=y-1 axes passing by the point (3,0) in base (x,y) and (0,0) in base (x',y')

y'²=2p'x'
d': x'=-5=-p'/2 ==> p'=10 and y²=20x'
Returning in base (x,y) : (y-1)²=20(x-3)

Answer B

Evaluate $\rm (3^2+1)/(3^2-1)+(5^2+1)/(5^2-1)+(7^2+1)/(7^2-1)+\ldots+(101^2+1)/(101^2-1) =$
With step by step explanation !

Answers

It's easier to deal with the symbolic sum (in sigma notation),

$\displaystyle\sum_(k=1)^(50)((2k+1)^2+1)/((2k+1)^2-1)$

Expanding the terms in the fraction, computing the quotient, and decomposing into partial fractions gives

$((2k+1)^2+1)/((2k+1)^2-1) = (4k^2 + 4k + 2)/(4k^2 + 4k)$

$=\frac12*(2k^2 + 2k + 1)/(k^2 + k)$

$=\frac12\left(2+\frac1{k(k+1)}\right)$

$=\frac12\left(2 + \frac1k - \frac1{k+1}\right)$

and it's the latter two terms that reveal a telescoping pattern.

In case you need more details about the partial fraction decomposition, we are looking for coefficients a and b such that

$\frac1{k(k+1)}=\frac ak+\frac b{k+1}$

$1 = a(k+1) +bk =(a+b)k+a$

which gives a = 1, and a + b = 0 so that b = -1.

Our sum has been rearranged as

$\displaystyle\frac12\sum_(k=1)^(50)\left(2+\frac1k-\frac1{k+1}\right)=\sum_(k=1)^(50)1+\frac12\sum_(k=1)^(50)\left(\frac1k-\frac1{k+1}\right)=50+\frac12\sum_(k=1)^(50)\left(\frac1k-\frac1{k+1}\right)$

The remaining telescoping sum is

1/2 [(1/1 - 1/2) + (1/2- 1/3) + (1/3- 1/4) + … + (1/48- 1/49) + (1/49- 1/50) + (1/50 - 1/51)]

and you can see how there are pairs of numbers that cancel, so that the sum reduces to

1/2 [1/1 - 1/51] = 1/2 [1 - 1/51] = 1/2 × 50/51 = 25/51

So, our original sum ends up being

$\displaystyle\sum_(k=1)^(50)((2k+1)^2+1)/((2k+1)^2-1) = 50 + (25)/(51) = \boxed{(2575)/(51)}$

64 is 4 times the difference between Sarah's age, a, and 44. Assume Sarah is older than 44

Answers

4(a-44)=64
a-44=16
a=60
Sarah is 60 years old.
Hope this helps.

Answer:

4(a-44)=64

Step-by-step explanation:

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