4.50Answer:
Step-by-step explanation:
Answer:
6s
Step-by-step explanation:
2) A positive exponent shows repeated multiplication . What repeated operation does a negative exponent show ?
I really need your help ! Thanks
SOLVE ALL OF IT :)
Step-by-step explanation:
Provided here is a photo.
all you do is to put 9.79 multiplied by .07 and it gives you 0.6853 so its .68 or .69 cents if u round the decimal
=====================================
Explanation:
The reference angle is angle S = 41 degrees. The side opposite that (RT) is unknown and what we want to find. The adjacent side to the reference angle is TS which is 8 units long.
RT = x
TS = 8
The ratio of the opposite and adjacent side is equal to the tangent of the reference angle, so,
tan(angle) = opposite/adjacent
tan(41) = x/8
--------------
We are given the value of tan(41) to be approximately 0.869, which means we will replace "tan(41)" with this decimal value and then isolate x by multiplying both sides by 8. This happens in the section below.
--------------
tan(41) = x/8
0.869 = x/8
8*0.869 = 8*x/8
6.952 = x
x = 6.952
x = 6.95
RT = 6.95
CM = 20
CP = 12
All of the right triangles are similar by AA similarity, so corresponding side lengths are proportional. The ratio of the long leg to the short leg is the same for the two smaller triangles, for example:
CP/AP = MP/CP
CP/9 = 16/CP . . . . . fill in the given numbers
CP² = 9·16 . . . . . . . multiply by 9·CP
CP = 3·4 = 12 . . . . . take the square root
Now, you can use the Pythagorean theorem to find AC and/or CM.
AC = √(9² +12²) = √225 = 15
CM = √(12² +16²) = √400 = 20
In summary, CP = 12, AC = 15, CM = 20.
_____
Once you have CM, you can see these are 3-4-5 right triangles, so you can determine the other lengths by using these side ratios.
3:4:5 = 9:12:15 = 12:16:20
_____
The altitude CP is called the "geometric mean" of AP and MP. It is the square root of their product. This is true for any right triangle, not just one with sides in the ratio 3:4:5. If you know this, you can write down your answers almost immediately. Above, we had to derive this fact using similarity.