Q. 2. Calcula el valor numérico de: M=4A−2B+1 Calcula el valor numeˊrico de: M=4A−20+1A=−(4−40×3+20−(5−12+4×3)]B=−2[4−4∣2+3(−1+6)∣−8)+(−2+9)
Simplify Expression for A: First, let's simplify the expression for A:A=−(4−40×3+20−(5−12+4×3))A=−(4−120+20−(5−12+12))A=−(4−120+20−5+12−12)A=−(4−100+12−12)A=−(4−100)A=−(−96)A=96
Simplify Expression for B: Now, let's simplify the expression for B:B=−2[4−4∣2+3(−1+6)∣−8]+(−2+9)B=−2[4−2+3(5)−8]+7B=−2[2+15−8]+7B=−2[9]+7B=−18+7B=−11
Calculate Value of M: Finally, let's calculate the value of M using the values of A and B we found:M=4A−2B+1M=4(96)−2(−11)+1M=384+22+1M=407
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