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User:Spekkio: Difference between revisions
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{{mylang|C|Active}}
{{mylang|C++|Beginner}}
{{mylang|GLSL|Beginner}}
{{mylang|Java|Active}}
{{mylang|JavaScript|Active}}
Line 16 ⟶ 17:
{{mylangend}}
<lang lisp>(defun pie() 31415926535897932384626433832795028841971693993751058209749/10000000000000000000000000000000000000000000000000000000000)
(defun factorial-rec (n)
(if (= n 0)
1
(* n (factorial-rec (- n 1)))))
(defun factorial (n &key (result 1))
(if (< n 2)
result
(factorial (- n 1) :result (* result n))))
(defun powint (a b &key (result 1))
(if (= b 0)
(if (> b 0)
(
)
)
Line 51 ⟶ 40:
(defun binom (alpha n)
(if (= n 0)
1
(if (= n 1)
alpha
(* (binom alpha (- n 1)) (/ (+ (- alpha n) 1) n))))
)
(defun power (a b n)
(if (= n 0)
1
(+
(* (binom b n) (powint (- a 1) n))
(power a b (- n 1)))))
(defun
(let ((cosn
))
(handler-case
(progn
(float cosn)
(if (= (+ prev cosn) prev ) prev
(powerw a b (1+ n) (+ prev cosn)))
)
(arithmetic-error (x) prev ))
)
)
Line 74 ⟶ 71:
(if (< b 1)
0
(
)
(if (< a 2)
(
0
)
Line 83 ⟶ 80:
)
(defun logw(x n prev)
(let ((cosn (* 2 (/ (powint x (+ (* 2 n) 1)) (+ (* 2 n) 1)))
))
(handler-case
(progn
(float cosn)
(
)
(
)
)
(defun
(+ (* 2 (/ (powint x (+ (* 2 n) 1)) (+ (* 2 n) 1)))
(logS x (- n 1)) ) ))
(defun
(defun
(let ((n10 (+ 10 n)))
(let ((
(if
(= (
(
)
)
))
(defun
(if (> x 0)
(loge x)
nil
))
(defun
(let ((cosn (
))
(handler-case
(progn
(float cosn)
(expw x (1+ n) (+ prev cosn))
)
(arithmetic-error (x) prev ))
)
)
(defun
(defun powern(x a) (expon (
(defun e (x) (expon x))
(defun pown (a b) (powern a b))
(defun sinew(x &key (n 0) (prev 0))
(let ((cosn (* (/ (powint -1 n) (factorial (+ (* 2 n) 1)) ) (powint x (+ (* 2 n) 1)))
))
(handler-case
(progn
(float cosn)
(sinew x :n (1+ n) :prev (+ prev cosn))
)
(arithmetic-error (x) (+ prev cosn) ))
)
)
(defun
(defun cosinew(x &key (n 0) (prev 0))
(let ((cosn (* (/ (powint -1 n) (factorial (* 2 n))) (powint x (* 2 n)))))
(handler-case
(progn
(float cosn)
(cosinew x :n (1+ n) :prev (+ prev cosn))
)
(arithmetic-error (x) (+ prev cosn) ))
)
)
(defun
(defun
(defun asinew(x &key (n 0) (prev 0))
(let ((cosn (/ (* (factorial (* 2 n)) (powint x (+ (* 2 n) 1))) (* (powint 4 n) (powint (factorial n) 2) (+ (* 2 n) 1)))
))
(handler-case
(progn
(float cosn)
(asinew x :n (1+ n) :prev (+ prev cosn))
)
(arithmetic-error (x) prev ))
)
)
(defun
(let ((
(let ((next 0))
(loop while (handler-case (float next) (arithmetic-error (err) NIL)) do
(progn
(setq next (+ (/ (* (factorial (* 2 n)) (powint x (+ (* 2 n) 1))) (* (powint 4 n) (powint (factorial n) 2) (+ (* 2 n) 1))) next))
(setq n (+ n 1))
)
)
)))
(defun
(if (< x 1)
(if (> x -1)
(
(/ (pie) -2)
)
Line 164 ⟶ 202:
(defun fibcalc (n)
(let ((sqrtFive (
(/ (- (powint (* 1/2 (+ 1 sqrtFive)) n) (powint (* 1/2 (- 1 sqrtFive)) n)) sqrtFive)))
Line 174 ⟶ 212:
(+ (fibrec (- n 1)) (fibrec (- n 2))))))
(defun test() (let ((n 0)) (loop while (< n 10) collect n do (if (= (float (sine n)) (sin n)) () (progn (write n) (write (terpri)) (write (sin n)) (write (terpri)) (write (float (sine n))) (write (terpri)) )) (setq n (+ n 1/10)))))</lang>
test:
[14]> (float (asine 9/100))
0.09012195
[14]> (asin 9/100)
Line 191 ⟶ 229:
Test 2:
[4]> (
1.0
[4]> (asin (sin 1))
1.0
Test 3:
[15]> (float (sine (* 45 (/ (* 2 (pie)) 360) )))
0.70710677
[15]> (float (squareroot 1/2))
0.70710677
[15]> (= (float (squareroot 1/2)) (float (sine (* 45 (/ (* 2 (pie)) 360) ))))
T
[15]> (= (sine (* 45 (/ (* 2 (pie)) 360) )) (sine (/ (pie) 4)))
T
[15]> (= (cosine (/ (pie) 4)) (sine (/ (pie) 4)))
NIL
[15]> (= (float (cosine (/ (pie) 4))) (float (sine (/ (pie) 4))))
T
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