MATHEMATICS HIGH SCHOOL

What type of angle is <CEB? ​
what type of angle is &lt;CEB? ​ - 1

Answers

Answer 1
Answer:

Answer:

obtuse angle

Step-by-step explanation:

m(<CEA)=m(<BED)=88 (vertically opposite angles)

So m(<CEB)+m(<AED)=360-(88+88)=182

m(<CEB)=m(<AED)= 182÷2=92

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What is the value of the expression below when c - 5 and d - 4 (c is to the second power)?6c2-5d+8
Pls help me with this question!!!
3 2/3+ 5 1/2 .....................???​
{x-3y=24}{3x+Y=12}Solve each of the following linear systems by eliminating

A watch was purchased for $25. The wholesale cost was $16. What percentage was the markup?64%
1.56%
56.25%
0.56%

Answers

If you would like to know what percentage was the markup, you can calculate this using the following steps:

x% of $16 is $25
x% * 16 = 25
x/100 * 16 = 25
x = 25 * 100 / 16
x = 156.25%

156.25% - 100% = 56.25%

The correct result would be 56.25%.

The value of k which makes f(x) = {sin 1/x, x≠0 { k , x=0 continuous at x=0 is? a. 8 b. 1 c. -1 d. none

Answers

Step-by-step explanation:

To make the function f(x) = {sin(1/x), x ≠ 0; k, x = 0} continuous at x = 0, we need to find the value of k that ensures the limit of f(x) as x approaches 0 exists and is equal to k.

First, let's find the limit of sin(1/x) as x approaches 0:

lim(x -> 0) sin(1/x)

This limit does not exist because sin(1/x) oscillates wildly as x gets closer to 0. Therefore, in order for the function to be continuous at x = 0, we need to choose k such that it compensates for the oscillations of sin(1/x) as x approaches 0.

A suitable choice for k is 0 because the limit of sin(1/x) as x approaches 0 is undefined, and setting k = 0 ensures that f(x) becomes a continuous function at x = 0.

So, the correct choice is:

d. None (k = 0)

Final answer:

The value of k that would make the function f(x) = sin(1/x) when x ≠0 and f(x) = k when x=0 continuous at x=0 doesn't exist. This is because the limit of sin(1/x) as x approaches 0 is undefined, hence the function cannot be made continuous at x = 0 for any value of k.

Explanation:

To find the value of k that makes the function continuous at x=0, we can apply the definition of continuity, which states that a function, f(x), is continuous at a certain point, x0, if three conditions are met:

  • the function is defined at x0
  • the limit as x approaches x0 of f(x) exists
  • the limit as x approaches x0 of f(x) is equal to f(x0)

In the case of the function f(x) = sin(1/x), the value for x = 0 is undefined, but we've been given that f(0) = k. To make the function continuous at x = 0, the value of k should ideally be equal to the limit of sin(1/x) as x approaches 0.

However, as x approaches 0, sin(1/x) oscillates between -1 and 1, making the limit non-existent. Because the limit does not exist, the function is not continuous at x=0 no matter the chosen value of k. Therefore, the correct answer is (d) None.

Learn more about Limits and Continuity here:

brainly.com/question/32625617

#SPJ11

The tens digit of a number is twice the ones digit. The sum of the digits in the number is 12. What is the number?

Answers

Let x = the ones digit
Let y = the tens digit

x+2y=12
x=2y
x+y=12 substitute x for 2y to get:
(2y)+y=12 add like terms to get:
3y=12
3y=12 divide both sides by 3 to get:
y=4
x+y=12 substitute y for 4 to get:
x+4=12 subtract 4 from both sides to get:
x=8
so if x=ones
and y=tens
then the answer is 48
Let there be two variables: t and o where t is for ten digit and o is for one digit:

So we have two equations:
t = 2o                           (1)
t+o = 12                       (2)

Subtract (2) from (1) and we get o = 12-2o

Now solve for o:

3o = 12

o = 4

Now plug in (1) or (2) and we have t = 8

Therefore our number is 10t + o = 84

Suppose that we have a right triangle $ABC$ with the right angle at $B$ such that $AC = \sqrt{61}$ and $AB = 5.$ A circle is drawn with its center on $AB$ such that the circle is tangent to $AC$ and $BC.$ If $P$ is the point where the circle and side $AC$ meet, then what is $CP$?

Answers

Answer:

  CP = 6

Step-by-step explanation:

The length of segment BC is given by the Pythagorean theorem:

  AC² = AB² +BC²

  (√61)² = 5² + BC² . . . . . fill in the given numbers

  61 -25 = BC² = 36 . . . . .subtract 25

  BC = 6 . . . . . . . . . . . . . . take the square root

Since the center of the circle is on AB and is tangent to BC, it must pass through point B. That is, segment BC of length 6 is one of the tangent lines from point C. The other one, to point P, must be the same length, so ...

  CP = 6

How many angles does a dodecagon have

Answers

A\ dodecagon\ has\ 12\ angles.\n\nSum\ of\ the\ angles\ is\ (12-2)\cdot 180^0=10\cdot180^0=1800^0
A dodecagon has 12 angles. 'Do' means two and 'Deca' means ten. That's how i got it.

Help me plz with this question

Answers

Answer:

y= -6x+23

Step-by-step explanation:

perpendicular: opposite signs and reciprocal

m= 1/6 and y-intercept = 23

y= -6x+23
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