Satellite Communication
.e., facsimile of printed matter or pictures) use a similar mechanism. In the case of intercontinental telecommunication, two or more satellites are linked together. High frequency radio and submarine cable systems have been widely used for long- distance overseas telecommunications. The high frequ..
Communicable diseases
No cure as it is viral. Crocin can give relief Jaundice Caused by virus. The various types are Hepatitis A, B, C, D, E, and C. Spread through contaminated food and water caused by virus Loss of appetite, yellow colouration due to excess bile pigment in the blood yellow urination fever, ..
Why satellite communication is costly?
The satellite communication is costly because of the limited life of a satellite. A geosynchronous satellite using high gain antenna requires close control of both its position and altitude. The position and altitude control rockets require fuel that has to be put in once for a..
Which of the following logistic functions satisfies the given conditio..
Which of the following logistic functions satisfies the given conditions: Initial value = 5, limit to growth = 40 and passing through (1, 20). => f ( t ) = 4 ( 2 e - ( 1 . 9 4 5 9 ) t ) or f ( t ) = 4 0 ( 1 + 7 e - ( 1 . 9 4 5 9 ) t ) or f ( t ) = 1 0 ( 1 + 3 e - ( 1 . 9 4 5 9 ) t ) or No..
Determine whether the sequence {2n sin-1 (1n)} converges or diverges. ..
Determine whether the sequence {2 n sin -1 ( 1 n )} converges or diverges. If the sequence converges, then determine its limit. => converges; 2 or diverges or converges; 0 or converges; 1 or converges; - 1..
Determine whether the sequence {(-1)n3n} converges or diverges. If the..
Determine whether the sequence { ( - 1 ) n 3 n } converges or diverges. If the sequence converges, then find its limit. => converges; - 1 3 or cannot be determined or converges; 0 or converges; 1 3 or diverges..
The length of a rod is to be 8.5 cm, with a tolerance of 0.04 cm. Expr..
The length of a rod is to be 8.5 cm, with a tolerance of 0.04 cm. Express the tolerance limit as an absolute value inequality. (Use the variable n for the actual measure of the part in cm.) => | n + 8.5 | ≤ 0.04 or | n - 8.5 | ≤ 0.04 or | n - 8.5 | < 0.04 or | n + 8.5 | < 0.04..
Use the Limit Comparison Test to determine whether the series ∑..
Use the Limit Comparison Test to determine whether the series ∑ n=1 ∞ 1 n - 1 + n is convergent or divergent. => convergent or divergent or cannot be determined..
Use the Limit Comparison Test to determine whether the series ∑..
Use the Limit Comparison Test to determine whether the series ∑ n=1 ∞ 1 n 2 - 1 is convergent or divergent. => cannot be determined or divergent or convergent..
Use the Limit Comparison Test to determine whether the series ∑..
Use the Limit Comparison Test to determine whether the series ∑ n=1 ∞ 1 n 2 - 1 is convergent or divergent. => cannot be determined or convergent or divergent..
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