An algorithm can not be written with the following infix expression without knowing what the expression is. Once this information is included a person will be able to know how to write the algorithm.
how can we convert algebraic expression into QBASIC a square + b square i = pTR/100 2xy mx+c a=r square a+b
if it convert
This question is so poorly phrased as to be unanswerable! There is no such thing as a distrubitive property. There is a distributive property but that is a property that applies to two binary operations (for example, the distributive property of multiplication over addition), but NOT to numbers. Also, there is no such word as algabraic. In any case, since there is no such thing as a distrubitive property number or even a distributive property number, it is not possible to convert that non-existent thing into an algebraic expression.
You must either (A) convert 9 inches to decimal form, or (B) 0.6 feet into inches. So you have two choices here. I will demonstrate them both for you. (A) To convert 9 inches into decimal, divide 9 by 12, that is 9/12 9 --- = 0.75 feet. 12 (B) To convert 0.6 feet into inches, multiply 12 by 0.6, that 0.6 * 12 0.6 * 12 = 7.2 inches.
convert $39.95 to rands
algorithm to convert a number representing radix r1 to radix r2
You convert an (infix) expression into a postfix expression as part of the process of generating code to evaluate that expression.
Linear search(a,item) n=length(a) for i=1 to n do if(a[i]==item) then return i end for return -1
how can we convert algebraic expression into QBASIC a square + b square i = pTR/100 2xy mx+c a=r square a+b
-8.90456*102
if it convert
hisince1 pound = 0.45359237 kilogramssoweight_in_kilo = weight_in_pounds * 0.45359237
3.74274 x 105
150 = 1.5 × 102
burat na flow chart
Develop an algorithm to display all prime numbers from 2 to 100. Give both the pseudocode version and the flowchart version. Convert your pseudocode into a Java program.
28