3. (a) Write the repeating decimal as a geometric series and (b) write the sum of...
Consider the following repeating decimal. 0.819 (a) Write the repeating decimal as a geometric series. 0.819 - (b) Write the sum of the series as the ratio of two integers.
hey thanks :0 Express the repeating decimal 0.123 as a geometric series and then use the sum of that series to express the decimal as the ration of two integers.
For part A please show it clearly make the Box Consider the following repeating decimal. 0.819 (a) Write the repeating decimal as a geometric series. 0.815 = 0.819 0.819 = 0.819 x + [ 0.00019 0.00019 x ( 10-2 10^-2 ) n = 0 (b) Write the sum of the series as the ratio of two integers. 811/990 Need Help? Read It Talk to a Tutor
Find the sum of the finite geometric series. 31 n=1 Need Help? Read It Watch It Talk to a Tutor 11. [-/1 Points] DETAILS Find the sum of the finite geometric series. 21 n-1 Need Help? Read it Talk to a Tutor 12. (-/1 Points] DETAILS Find the sum of the finite geometric series. er n-1 Write the rational number as the quotient of two integers in simplest form. 0.7 Need Help? Read It Watch It Talk to a Tutor...
Find the sum of each geometric series: ΣXe) n +3 Σ-5 b) 50 n-0 n-1 Find the sum of each geometric series: ΣXe) n +3 Σ-5 b) 50 n-0 n-1
4) Evaluate dx (4 – x²) 3/2 5) Evaluate the improper integral ſxe**dx 0 6) Express the repeating decimal 0.123 as a geometric series and then use the sum of that series to express the decimal as the ration of two integers.
Find the sum of each of the geometric series given below. For the value of the sum, enter an expression that gives the exact value, rather than entering an approximation. Find the sum of each of the geometric series given below. For the value of the sum, enter an expression that gives the exact value, rather than entering an approximation. - + ... + x = -3.99 A. –6+3 – + B. Ž ()" =
Find the sum of the given finite geometric series. 6.6 .+ 65536 65536 The sum of the finite geometric series is (Type an integer or a simplified fraction.)
18) Write 0.2121 as a fraction of two integers using a geometric series 19) Evaluate the improper integral; } dos
Problem 1 Geometric Series. We will need to sum the geometric series to simplify some of the partition functions developed in class. Prove that the geometric series 7:0 for r| < 1. You may find it helpful to consider the partial sums Sj ?, xk 1+1+-.+4 and rSi =x+x2 + +z?+1 take the limit J ? 00, Can you see why the geomet ric series converges for r < 1 and diverges for ll 2 1 Explain. . You will...