+from sfpy import Float32
+
+
# XXX DO NOT USE, fails on num=65536. wark-wark...
def sqrtsimple(num):
res = 0
def sqrt(num):
D = num # D is input (from num)
Q = 0
- R = 0
- r = 0 # remainder
- for i in range(15, -1, -1): # negative ranges are weird...
-
- if (R>=0):
-
- R = (R<<2)|((D>>(i+i))&3)
- R = R-((Q<<2)|1) #/*-Q01*/
-
- else:
+ R = 0 # remainder
+ for i in range(64, -1, -1): # negative ranges are weird...
+
+ R = (R<<2)|((D>>(i+i))&3)
- R = (R<<2)|((D>>(i+i))&3)
- R = R+((Q<<2)|3) #/*+Q11*/
-
- if (R>=0):
- Q = (Q<<1)|1 #/*new Q:*/
+ if R >= 0:
+ R -= ((Q<<2)|1) # -Q01
else:
- Q = (Q<<1)|0 #/*new Q:*/
-
+ R += ((Q<<2)|3) # +Q11
- if (R<0):
- R = R+((Q<<1)|1)
- r = R
- return Q
+ Q <<= 1
+ if R >= 0:
+ Q |= 1 # new Q
+
+ if R < 0:
+ R = R + ((Q<<1)|1)
+
+ return Q, R
# grabbed these from unit_test_single (convenience, this is just experimenting)
def main(mantissa, exponent):
if exponent & 1 != 0:
# shift mantissa up, subtract 1 from exp to compensate
- return sqrt(mantissa << 1), (exponent - 1) >> 1
- # mantissa as-is, no compensating needed on exp
- return sqrt(mantissa), (exponent >> 1)
+ mantissa <<= 1
+ exponent -= 1
+ m, r = sqrt(mantissa)
+ return m, r, exponent >> 1
+
+
+def fsqrt_test(x):
+ xbits = x.bits
+ print ("x", x, type(x))
+ sq_test = x.sqrt()
+ print ("sqrt", sq_test)
+
+ print (xbits, type(xbits))
+ s, e, m = decode_fp32(xbits)
+ print("x decode", s, e, m, hex(m))
+
+ m |= 1<<23 # set top bit (the missing "1" from mantissa)
+ m <<= 27
+
+ sm, sr, se = main(m, e)
+ lowbits = sm & 0x3
+ sm >>= 2
+ sm = get_mantissa(sm)
+ #sm += 2
+ print("our sqrt", s, se, sm, hex(sm), bin(sm), "lowbits", lowbits,
+ "rem", hex(sr))
+ if lowbits >= 2:
+ print ("probably needs rounding (+1 on mantissa)")
+
+ sq_xbits = sq_test.bits
+ s, e, m = decode_fp32(sq_xbits)
+ print ("sf32 sqrt", s, e, m, hex(m), bin(m))
+ print ()
if __name__ == '__main__':
+
+ # quick test up to 1000 of two sqrt functions
for Q in range(1, int(1e4)):
print(Q, sqrt(Q), sqrtsimple(Q), int(Q**0.5))
assert int(Q**0.5) == sqrtsimple(Q), "Q sqrtsimpl fail %d" % Q
- assert int(Q**0.5) == sqrt(Q), "Q sqrt fail %d" % Q
+ assert int(Q**0.5) == sqrt(Q)[0], "Q sqrt fail %d" % Q
+
+ # quick mantissa/exponent demo
+ for e in range(26):
+ for m in range(26):
+ ms, mr, es = main(m, e)
+ print("m:%d e:%d sqrt: m:%d-%d e:%d" % (m, e, ms, mr, es))
+
+ x = Float32(1234.123456789)
+ fsqrt_test(x)
+ x = Float32(32.1)
+ fsqrt_test(x)
+ x = Float32(16.0)
+ fsqrt_test(x)
+ x = Float32(8.0)
+ fsqrt_test(x)
+ x = Float32(8.5)
+ fsqrt_test(x)
+ x = Float32(3.14159265358979323)
+ fsqrt_test(x)
+ x = Float32(12.99392923123123)
+ fsqrt_test(x)
+ x = Float32(0.123456)
+ fsqrt_test(x)
+"""
- for e in range(25):
- for m in range(25):
- print(main(m, e))
+Notes:
+https://pdfs.semanticscholar.org/5060/4e9aff0e37089c4ab9a376c3f35761ffe28b.pdf
-"""
//This is the main code of integer sqrt function found here:http://verilogcodes.blogspot.com/2017/11/a-verilog-function-for-finding-square-root.html
//