2000 Power of 2+1999 power of 2 How much? 2 2000+2 1999 How much?

2000 Power of 2+1999 power of 2
=2009 Power of 2*(2+1)
=2009 Power of 3*2

2 2000+2 1999
=2009 Power of 2*(2+1)
=2009 Power of 3*2

(5 Out of 13)1999th power multiplied by (2 out of 5)2000th power

(5/13)^1999×(2+3/5)^2000
=(5/13)^1999×(13/5)^2000
=(5/13)^1999×(13/5)^1999×13/5
=1^1999×13/5
=13/5

RELATED INFORMATIONS

1. 3 To the 2000th power minus 5*3 to the 1999th power plus 6*3 to the 1998th power There are no brackets in the question O * is the number 3 To the 2000th power minus 5*3 to the 1999th power plus 6*3 to the 1998th power There are no brackets for the subject Oh, it's a ride.
2. (1) The absolute value of the number a is the distance from the point representing the number a on the number axis to the origin (2) The minimum absolute value is 0. (3) If the absolute value of A is greater than that of B, then A must be greater than B. (4) If the absolute value of a is equal to a, then a must be a positive number.
3. Draw points on the number axis that represent the following numbers, and indicate them with absolute value symbols, and find their absolute values.-4,-1 and 1,0, +2,3 And 1 in 4 If it is not convenient to answer, please tell me how to use the absolute sign. Draw points on the number axis that represent the following numbers, and indicate them with absolute value symbols, and find their absolute values.-4,-1 and 1/2,0, +2,3 And 1 in 4 If it is not convenient to answer, please tell me how to use the absolute sign.
4. Find the value of 1/2 plus one-square plus one-square plus one-square plus one-quadratic plus one-quadratic plus one-n-th-th-plus-two (the result is expressed containing n) Find the value of 1/2 plus one-square plus one-square plus one-square plus one-quadratic plus one-quadratic plus one-nth-power plus two. Find the value of 1/2 plus one-squared plus one-cubic plus one-quadratic plus one-quadratic plus one-n-th-th-plus-two (the result is expressed by an equation containing n)
5. Calculation:(-1)*(-1)*(-1)*…… *(-1) To the 99th power *(-1) to the 100th power =
6. How much is the 98th power of the 99th power of the +2 of the 100th power of the +2 of the 2? How much is the 98th power of the 99th power of the 2th power +2 at + until the 1st power of the 2nd power How much is the 98th power of the 99th power of the 2th power +2 at + until the 1st power of the 2nd power at +1
7. Given x4+x3+x2+x1=0, calculate the value of x100+x99+x98+x97+x96.
8. If the square of a + a +1=0, the 2001 power of a + the 2000 power of a + the 1999 power of a =
9. Calculation:32000-5×31999+6×31998
10. What is the last digit of the 2010 power of 3 plus (-2)
11. What is (-2)99th power -(-2)98th power -(-2)97th power?
12. If A squared plus A plus 1=0, then A's 2009 power plus A's 2008 power plus... Add A and 2009
13. Calculation 20083−2×20082−2006 20083+20082−2009.
14. X and y are reciprocal numbers, m and n are reciprocal numbers,|a|=1, and the value of a2-(x+y+mn) a+(x+y)2012 power +(-mn)2013 power is obtained.
15. Given that x.y is opposite to each other and a.b is reciprocal, then the value of the 2012 power (-ab) of (xy) is the value of the 2013 power.
16. What is the definition of irrational number? How to express it on the number axis? What is irrationality?
17. Definition of irrational numbers Which of the following statements is true? An irrational number is a number that the square can't open B. An irrational number is an infinite non-recurring decimal C. irrational numbers include positive irrational numbers, zero, negative irrational numbers D. All irrational numbers can be represented by points on the number axis Definition of irrational numbers Which of the following statements is true? An irrational number is a number that the square can't fill B. An irrational number is an infinite non-recurring decimal C. irrational numbers include positive irrational numbers, zero, negative irrational numbers D. All irrational numbers can be represented by points on the number axis
18. Meaning of proportion
19. If the reciprocal of a is itself, the absolute value of b is 3, and the opposite number of c is 5. Find the value of algebra 4a-[2a2-(3b-4a+c)]. I think there's some way to solve it. If the inverse of a is itself, the absolute value of b is 3, and the inverse of c is 5. Find the value of the algebra 4a-[ the square of 2a-(3b-4a+c)]. (Wrong number) If the reciprocal of a is itself, the absolute value of b is 3, and the opposite number of c is 5. Find the value of algebra 4a-[2a2-(3b-4a+c)]. There seem to be some solutions. If the inverse of a is itself, the absolute value of b is 3, and the inverse of c is 5. Find the value of the algebra 4a-[ the square of 2a-(3b-4a+c)]. (Wrong number)
20. If ab is the opposite number and cd is the reciprocal number, m is the rational number with the smallest absolute value, then 2a+2b-3cd+m =()